Generated Code
The following is c code generated by the CellML API from this CellML file. (Back to language selection)
The raw code is available.
/*
There are a total of 251 entries in the algebraic variable array.
There are a total of 57 entries in each of the rate and state variable arrays.
There are a total of 232 entries in the constant variable array.
*/
/*
* VOI is time in component environment (millisecond).
* CONSTANTS[0] is celltype in component environment (dimensionless).
* CONSTANTS[1] is nao in component extracellular (millimolar).
* CONSTANTS[2] is cao in component extracellular (millimolar).
* CONSTANTS[3] is ko in component extracellular (millimolar).
* CONSTANTS[4] is R in component physical_constants (joule_per_kilomole_kelvin).
* CONSTANTS[5] is T in component physical_constants (kelvin).
* CONSTANTS[6] is F in component physical_constants (coulomb_per_mole).
* CONSTANTS[7] is zna in component physical_constants (dimensionless).
* CONSTANTS[8] is zca in component physical_constants (dimensionless).
* CONSTANTS[9] is zk in component physical_constants (dimensionless).
* CONSTANTS[10] is L in component cell_geometry (centimeter).
* CONSTANTS[11] is rad in component cell_geometry (centimeter).
* CONSTANTS[184] is vcell in component cell_geometry (microliter).
* CONSTANTS[200] is Ageo in component cell_geometry (centimeter_squared).
* CONSTANTS[202] is Acap in component cell_geometry (centimeter_squared).
* CONSTANTS[203] is vmyo in component cell_geometry (microliter).
* CONSTANTS[204] is vnsr in component cell_geometry (microliter).
* CONSTANTS[205] is vjsr in component cell_geometry (microliter).
* CONSTANTS[206] is vss in component cell_geometry (microliter).
* CONSTANTS[207] is vsr in component cell_geometry (microliter).
* STATES[0] is v in component membrane (millivolt).
* ALGEBRAIC[22] is vffrt in component membrane (coulomb_per_mole).
* ALGEBRAIC[31] is vfrt in component membrane (dimensionless).
* ALGEBRAIC[54] is INa in component INa (microA_per_microF).
* ALGEBRAIC[56] is INaL in component INaL (microA_per_microF).
* ALGEBRAIC[62] is Ito in component Ito (microA_per_microF).
* ALGEBRAIC[143] is ICaL in component ICaL (microA_per_microF).
* ALGEBRAIC[145] is ICaNa in component ICaL (microA_per_microF).
* ALGEBRAIC[146] is ICaK in component ICaL (microA_per_microF).
* ALGEBRAIC[147] is IKr in component IKr (microA_per_microF).
* ALGEBRAIC[149] is IKs in component IKs (microA_per_microF).
* ALGEBRAIC[151] is IK1 in component IK1 (microA_per_microF).
* ALGEBRAIC[183] is INaCa_i in component INaCa_i (microA_per_microF).
* ALGEBRAIC[213] is INaCa_ss in component INaCa_i (microA_per_microF).
* ALGEBRAIC[232] is INaK in component INaK (microA_per_microF).
* ALGEBRAIC[235] is INab in component INab (microA_per_microF).
* ALGEBRAIC[234] is IKb in component IKb (microA_per_microF).
* ALGEBRAIC[239] is IpCa in component IpCa (microA_per_microF).
* ALGEBRAIC[237] is ICab in component ICab (microA_per_microF).
* CONSTANTS[12] is pstim in component membrane (dimensionless).
* ALGEBRAIC[8] is Istim in component membrane (microA_per_microF).
* CONSTANTS[13] is i_Stim_Start in component membrane (millisecond).
* CONSTANTS[14] is i_Stim_End in component membrane (millisecond).
* CONSTANTS[15] is i_Stim_Amplitude in component membrane (microA_per_microF).
* CONSTANTS[16] is i_Stim_Period in component membrane (millisecond).
* CONSTANTS[17] is i_Stim_PulseDuration in component membrane (millisecond).
* CONSTANTS[18] is KmCaMK in component CaMK (millimolar).
* CONSTANTS[19] is aCaMK in component CaMK (per_millimolar_per_millisecond).
* CONSTANTS[20] is bCaMK in component CaMK (per_millisecond).
* CONSTANTS[21] is CaMKo in component CaMK (dimensionless).
* CONSTANTS[22] is KmCaM in component CaMK (millimolar).
* ALGEBRAIC[37] is CaMKb in component CaMK (millimolar).
* ALGEBRAIC[39] is CaMKa in component CaMK (millimolar).
* STATES[1] is CaMKt in component CaMK (millimolar).
* STATES[2] is cass in component intracellular_ions (millimolar).
* CONSTANTS[23] is cmdnmax_b in component intracellular_ions (millimolar).
* CONSTANTS[173] is cmdnmax in component intracellular_ions (millimolar).
* CONSTANTS[24] is kmcmdn in component intracellular_ions (millimolar).
* CONSTANTS[25] is trpnmax in component intracellular_ions (millimolar).
* CONSTANTS[26] is kmtrpn in component intracellular_ions (millimolar).
* CONSTANTS[27] is BSRmax in component intracellular_ions (millimolar).
* CONSTANTS[28] is KmBSR in component intracellular_ions (millimolar).
* CONSTANTS[29] is BSLmax in component intracellular_ions (millimolar).
* CONSTANTS[30] is KmBSL in component intracellular_ions (millimolar).
* CONSTANTS[31] is csqnmax in component intracellular_ions (millimolar).
* CONSTANTS[32] is kmcsqn in component intracellular_ions (millimolar).
* STATES[3] is nai in component intracellular_ions (millimolar).
* STATES[4] is nass in component intracellular_ions (millimolar).
* STATES[5] is ki in component intracellular_ions (millimolar).
* STATES[6] is kss in component intracellular_ions (millimolar).
* CONSTANTS[33] is cansr in component intracellular_ions (millimolar).
* CONSTANTS[34] is cajsr in component intracellular_ions (millimolar).
* STATES[7] is casr in component intracellular_ions (millimolar).
* STATES[8] is cai in component intracellular_ions (millimolar).
* ALGEBRAIC[238] is JdiffNa in component diff (millimolar_per_millisecond).
* ALGEBRAIC[240] is Jdiff in component diff (millimolar_per_millisecond).
* ALGEBRAIC[250] is Jup in component SERCA (millimolar_per_millisecond).
* ALGEBRAIC[236] is JdiffK in component diff (millimolar_per_millisecond).
* ALGEBRAIC[245] is Jrel in component ryr (millimolar_per_millisecond).
* CONSTANTS[174] is Jtr in component trans_flux (millimolar_per_millisecond).
* ALGEBRAIC[249] is Jleak in component SERCA (millimolar_per_millisecond).
* ALGEBRAIC[41] is Bcai in component intracellular_ions (dimensionless).
* ALGEBRAIC[45] is Bcasr in component intracellular_ions (dimensionless).
* ALGEBRAIC[43] is Bcass in component intracellular_ions (dimensionless).
* CONSTANTS[35] is cm in component intracellular_ions (microF_per_centimeter_squared).
* CONSTANTS[36] is PKNa in component reversal_potentials (dimensionless).
* ALGEBRAIC[48] is ENa in component reversal_potentials (millivolt).
* ALGEBRAIC[49] is EK in component reversal_potentials (millivolt).
* ALGEBRAIC[50] is EKs in component reversal_potentials (millivolt).
* CONSTANTS[37] is EKshift in component reversal_potentials (millivolt).
* CONSTANTS[38] is btj in component INa (dimensionless).
* CONSTANTS[39] is bGNa in component INa (dimensionless).
* ALGEBRAIC[0] is mss in component INa (dimensionless).
* ALGEBRAIC[15] is tm in component INa (millisecond).
* CONSTANTS[40] is mssV1 in component INa (millivolt).
* CONSTANTS[41] is mssV2 in component INa (millivolt).
* CONSTANTS[42] is mtV1 in component INa (millivolt).
* CONSTANTS[43] is mtV2 in component INa (millivolt).
* CONSTANTS[44] is mtD1 in component INa (dimensionless).
* CONSTANTS[45] is mtD2 in component INa (dimensionless).
* CONSTANTS[46] is mtV3 in component INa (millivolt).
* CONSTANTS[47] is mtV4 in component INa (millivolt).
* STATES[9] is m in component INa (dimensionless).
* ALGEBRAIC[1] is hss in component INa (dimensionless).
* ALGEBRAIC[16] is thf in component INa (millisecond).
* ALGEBRAIC[17] is ths in component INa (millisecond).
* CONSTANTS[48] is hssV1 in component INa (millivolt).
* CONSTANTS[49] is hssV2 in component INa (millivolt).
* CONSTANTS[175] is Ahs in component INa (dimensionless).
* CONSTANTS[50] is Ahf in component INa (dimensionless).
* STATES[10] is hf in component INa (dimensionless).
* STATES[11] is hs in component INa (dimensionless).
* ALGEBRAIC[51] is h in component INa (dimensionless).
* CONSTANTS[51] is GNa in component INa (milliS_per_microF).
* ALGEBRAIC[18] is jss in component INa (dimensionless).
* ALGEBRAIC[26] is tj in component INa (millisecond).
* STATES[12] is j in component INa (dimensionless).
* ALGEBRAIC[27] is hssp in component INa (dimensionless).
* ALGEBRAIC[33] is thsp in component INa (millisecond).
* STATES[13] is hsp in component INa (dimensionless).
* ALGEBRAIC[52] is hp in component INa (dimensionless).
* ALGEBRAIC[34] is tjp in component INa (millisecond).
* STATES[14] is jp in component INa (dimensionless).
* ALGEBRAIC[53] is fINap in component INa (dimensionless).
* CONSTANTS[52] is bGnal in component INaL (dimensionless).
* CONSTANTS[53] is bthL in component INaL (dimensionless).
* ALGEBRAIC[28] is mLss in component INaL (dimensionless).
* ALGEBRAIC[35] is tmL in component INaL (millisecond).
* STATES[15] is mL in component INaL (dimensionless).
* CONSTANTS[176] is thL in component INaL (millisecond).
* ALGEBRAIC[2] is hLss in component INaL (dimensionless).
* STATES[16] is hL in component INaL (dimensionless).
* ALGEBRAIC[3] is hLssp in component INaL (dimensionless).
* CONSTANTS[198] is thLp in component INaL (millisecond).
* STATES[17] is hLp in component INaL (dimensionless).
* CONSTANTS[54] is GNaL_b in component INaL (milliS_per_microF).
* CONSTANTS[177] is GNaL in component INaL (milliS_per_microF).
* ALGEBRAIC[55] is fINaLp in component INaL (dimensionless).
* CONSTANTS[55] is bGto in component Ito (dimensionless).
* CONSTANTS[56] is Gto_b in component Ito (milliS_per_microF).
* ALGEBRAIC[4] is ass in component Ito (dimensionless).
* ALGEBRAIC[19] is ta in component Ito (millisecond).
* STATES[18] is a in component Ito (dimensionless).
* ALGEBRAIC[5] is iss in component Ito (dimensionless).
* ALGEBRAIC[20] is delta_epi in component Ito (dimensionless).
* ALGEBRAIC[29] is tiF_b in component Ito (millisecond).
* ALGEBRAIC[36] is tiS_b in component Ito (millisecond).
* ALGEBRAIC[38] is tiF in component Ito (millisecond).
* ALGEBRAIC[40] is tiS in component Ito (millisecond).
* ALGEBRAIC[57] is AiF in component Ito (dimensionless).
* ALGEBRAIC[58] is AiS in component Ito (dimensionless).
* STATES[19] is iF in component Ito (dimensionless).
* STATES[20] is iS in component Ito (dimensionless).
* ALGEBRAIC[59] is i in component Ito (dimensionless).
* ALGEBRAIC[30] is assp in component Ito (dimensionless).
* STATES[21] is ap in component Ito (dimensionless).
* ALGEBRAIC[42] is dti_develop in component Ito (dimensionless).
* ALGEBRAIC[44] is dti_recover in component Ito (dimensionless).
* ALGEBRAIC[46] is tiFp in component Ito (millisecond).
* ALGEBRAIC[47] is tiSp in component Ito (millisecond).
* STATES[22] is iFp in component Ito (dimensionless).
* STATES[23] is iSp in component Ito (dimensionless).
* ALGEBRAIC[60] is ip in component Ito (dimensionless).
* CONSTANTS[178] is Gto in component Ito (milliS_per_microF).
* ALGEBRAIC[61] is fItop in component Ito (dimensionless).
* CONSTANTS[57] is EKshift in component Ito (millivolt).
* CONSTANTS[179] is r_down in component ICaL (dimensionless).
* ALGEBRAIC[64] is r_up in component ICaL (dimensionless).
* CONSTANTS[58] is undo_CDI in component ICaL (dimensionless).
* STATES[24] is nca in component ICaL (dimensionless).
* ALGEBRAIC[6] is jncass in component ICaL (dimensionless).
* CONSTANTS[59] is tjnca in component ICaL (millisecond).
* STATES[25] is jnca in component ICaL (dimensionless).
* ALGEBRAIC[7] is km2n in component ICaL (per_millisecond).
* CONSTANTS[60] is Kmn in component ICaL (millimolar).
* ALGEBRAIC[21] is anca in component ICaL (dimensionless).
* CONSTANTS[61] is k2n in component ICaL (per_millisecond).
* CONSTANTS[62] is kmn in component ICaL (millimolar).
* ALGEBRAIC[65] is dss in component ICaL (dimensionless).
* ALGEBRAIC[66] is td in component ICaL (millisecond).
* ALGEBRAIC[67] is alpha in component ICaL (dimensionless).
* ALGEBRAIC[68] is beta in component ICaL (dimensionless).
* ALGEBRAIC[69] is jcass_new in component ICaL (dimensionless).
* ALGEBRAIC[70] is jcass_VD in component ICaL (dimensionless).
* ALGEBRAIC[71] is jcass_CD in component ICaL (dimensionless).
* ALGEBRAIC[72] is jcass_VDp in component ICaL (dimensionless).
* ALGEBRAIC[73] is jcass_CDp in component ICaL (dimensionless).
* ALGEBRAIC[74] is tjca_new in component ICaL (dimensionless).
* ALGEBRAIC[75] is tjca_VD in component ICaL (dimensionless).
* ALGEBRAIC[76] is tjca_CD in component ICaL (dimensionless).
* ALGEBRAIC[77] is tjca_VDp in component ICaL (dimensionless).
* ALGEBRAIC[78] is tjca_CDp in component ICaL (dimensionless).
* ALGEBRAIC[79] is psi_VD in component ICaL (dimensionless).
* ALGEBRAIC[80] is psi_VDp in component ICaL (dimensionless).
* ALGEBRAIC[81] is psi_CD in component ICaL (dimensionless).
* ALGEBRAIC[82] is psi_CDp in component ICaL (dimensionless).
* ALGEBRAIC[83] is omega_VD in component ICaL (dimensionless).
* ALGEBRAIC[84] is omega_VDp in component ICaL (dimensionless).
* ALGEBRAIC[85] is omega_CD in component ICaL (dimensionless).
* ALGEBRAIC[86] is omega_CDp in component ICaL (dimensionless).
* ALGEBRAIC[87] is f1ss_0 in component ICaL (dimensionless).
* ALGEBRAIC[88] is tf1_0 in component ICaL (dimensionless).
* CONSTANTS[180] is ktaup in component ICaL (dimensionless).
* ALGEBRAIC[89] is gamma_VD in component ICaL (dimensionless).
* ALGEBRAIC[90] is delta_VD in component ICaL (dimensionless).
* ALGEBRAIC[93] is gamma_VDp in component ICaL (dimensionless).
* ALGEBRAIC[94] is delta_VDp in component ICaL (dimensionless).
* CONSTANTS[63] is kCDI in component ICaL (dimensionless).
* ALGEBRAIC[95] is gamma_CD in component ICaL (dimensionless).
* ALGEBRAIC[96] is delta_CD in component ICaL (dimensionless).
* ALGEBRAIC[99] is gamma_CDp in component ICaL (dimensionless).
* ALGEBRAIC[100] is delta_CDp in component ICaL (dimensionless).
* ALGEBRAIC[91] is tf1_VD in component ICaL (dimensionless).
* ALGEBRAIC[97] is tf1_CD in component ICaL (dimensionless).
* ALGEBRAIC[92] is f1ss_VD in component ICaL (dimensionless).
* ALGEBRAIC[98] is f1ss_CD in component ICaL (dimensionless).
* ALGEBRAIC[101] is tf2_new in component ICaL (dimensionless).
* ALGEBRAIC[103] is tf2_VD in component ICaL (dimensionless).
* ALGEBRAIC[106] is tf2_CD in component ICaL (dimensionless).
* ALGEBRAIC[102] is tf2_VDp in component ICaL (dimensionless).
* ALGEBRAIC[109] is tf2_CDp in component ICaL (dimensionless).
* ALGEBRAIC[104] is theta_VD in component ICaL (dimensionless).
* ALGEBRAIC[112] is theta_CD in component ICaL (dimensionless).
* ALGEBRAIC[105] is theta_VDp in component ICaL (dimensionless).
* ALGEBRAIC[113] is theta_CDp in component ICaL (dimensionless).
* ALGEBRAIC[107] is eta_VD in component ICaL (dimensionless).
* ALGEBRAIC[108] is eta_VDp in component ICaL (dimensionless).
* ALGEBRAIC[114] is eta_CD in component ICaL (dimensionless).
* ALGEBRAIC[115] is eta_CDp in component ICaL (dimensionless).
* ALGEBRAIC[110] is tf2post_VD in component ICaL (dimensionless).
* ALGEBRAIC[116] is tf2post_CD in component ICaL (dimensionless).
* ALGEBRAIC[111] is f2ss_VD in component ICaL (dimensionless).
* ALGEBRAIC[117] is f2ss_CD in component ICaL (dimensionless).
* ALGEBRAIC[118] is PhiCaL in component ICaL (coulomb_per_metre_3).
* ALGEBRAIC[119] is PhiCaNa in component ICaL (coulomb_per_metre_3).
* ALGEBRAIC[120] is PhiCaK in component ICaL (coulomb_per_metre_3).
* CONSTANTS[208] is PCa in component ICaL (dimensionless).
* CONSTANTS[209] is PCap in component ICaL (dimensionless).
* CONSTANTS[210] is PCaNa in component ICaL (dimensionless).
* CONSTANTS[211] is PCaK in component ICaL (dimensionless).
* CONSTANTS[212] is PCaNap in component ICaL (dimensionless).
* CONSTANTS[213] is PCaKp in component ICaL (dimensionless).
* CONSTANTS[64] is PCa_b in component ICaL (dimensionless).
* STATES[26] is I1k in component ICaL (dimensionless).
* STATES[27] is I2k in component ICaL (dimensionless).
* STATES[28] is Ck in component ICaL (dimensionless).
* STATES[29] is I1kp in component ICaL (dimensionless).
* STATES[30] is I2kp in component ICaL (dimensionless).
* STATES[31] is Ckp in component ICaL (dimensionless).
* STATES[32] is I1Cak in component ICaL (dimensionless).
* STATES[33] is I2Cak in component ICaL (dimensionless).
* STATES[34] is CCak in component ICaL (dimensionless).
* STATES[35] is I1Cakp in component ICaL (dimensionless).
* STATES[36] is I2Cakp in component ICaL (dimensionless).
* STATES[37] is CCakp in component ICaL (dimensionless).
* STATES[38] is Ok in component ICaL (dimensionless).
* STATES[39] is Okp in component ICaL (dimensionless).
* ALGEBRAIC[121] is OCak in component ICaL (dimensionless).
* ALGEBRAIC[122] is OCakp in component ICaL (dimensionless).
* ALGEBRAIC[123] is ICaL_VD in component ICaL (dimensionless).
* ALGEBRAIC[124] is ICaL_VDp in component ICaL (dimensionless).
* ALGEBRAIC[126] is ICaL_CD in component ICaL (dimensionless).
* ALGEBRAIC[127] is ICaL_CDp in component ICaL (dimensionless).
* ALGEBRAIC[129] is ICaNa_VD in component ICaL (dimensionless).
* ALGEBRAIC[130] is ICaNa_VDp in component ICaL (dimensionless).
* ALGEBRAIC[131] is ICaNa_CD in component ICaL (dimensionless).
* ALGEBRAIC[132] is ICaNa_CDp in component ICaL (dimensionless).
* ALGEBRAIC[133] is ICaK_VD in component ICaL (dimensionless).
* ALGEBRAIC[134] is ICaK_VDp in component ICaL (dimensionless).
* ALGEBRAIC[135] is ICaK_CD in component ICaL (dimensionless).
* ALGEBRAIC[136] is ICaK_CDp in component ICaL (dimensionless).
* ALGEBRAIC[137] is ICaLnp in component ICaL (dimensionless).
* ALGEBRAIC[138] is ICaLp in component ICaL (dimensionless).
* ALGEBRAIC[125] is ICaLVD in component ICaL (dimensionless).
* ALGEBRAIC[128] is ICaLCD in component ICaL (dimensionless).
* ALGEBRAIC[139] is ICaNanp in component ICaL (dimensionless).
* ALGEBRAIC[140] is ICaNap in component ICaL (dimensionless).
* ALGEBRAIC[141] is ICaKnp in component ICaL (dimensionless).
* ALGEBRAIC[142] is ICaKp in component ICaL (dimensionless).
* ALGEBRAIC[63] is fICaLp in component ICaL (dimensionless).
* CONSTANTS[65] is bGCaL in component ICaL (dimensionless).
* ALGEBRAIC[144] is gICaL in component ICaL (microF).
* CONSTANTS[66] is GKr_b in component IKr (milliS_per_microF).
* STATES[40] is IC1 in component IKr (dimensionless).
* STATES[41] is IC2 in component IKr (dimensionless).
* STATES[42] is C1 in component IKr (dimensionless).
* STATES[43] is C2 in component IKr (dimensionless).
* STATES[44] is O in component IKr (dimensionless).
* STATES[45] is IO in component IKr (dimensionless).
* STATES[46] is IObound in component IKr (dimensionless).
* STATES[47] is Obound in component IKr (dimensionless).
* STATES[48] is Cbound in component IKr (dimensionless).
* STATES[49] is D in component IKr (dimensionless).
* CONSTANTS[181] is GKr in component IKr (milliS_per_microF).
* CONSTANTS[199] is GKr_total in component IKr (milliS_per_microF).
* CONSTANTS[67] is A1 in component IKr (per_millisecond).
* CONSTANTS[68] is B1 in component IKr (per_millivolt).
* CONSTANTS[69] is q1 in component IKr (dimensionless).
* CONSTANTS[70] is A2 in component IKr (per_millisecond).
* CONSTANTS[71] is B2 in component IKr (per_millivolt).
* CONSTANTS[72] is q2 in component IKr (dimensionless).
* CONSTANTS[73] is A3 in component IKr (per_millisecond).
* CONSTANTS[74] is B3 in component IKr (per_millivolt).
* CONSTANTS[75] is q3 in component IKr (dimensionless).
* CONSTANTS[76] is A4 in component IKr (per_millisecond).
* CONSTANTS[77] is B4 in component IKr (per_millivolt).
* CONSTANTS[78] is q4 in component IKr (dimensionless).
* CONSTANTS[79] is A11 in component IKr (per_millisecond).
* CONSTANTS[80] is B11 in component IKr (per_millivolt).
* CONSTANTS[81] is q11 in component IKr (dimensionless).
* CONSTANTS[82] is A21 in component IKr (per_millisecond).
* CONSTANTS[83] is B21 in component IKr (per_millivolt).
* CONSTANTS[84] is q21 in component IKr (dimensionless).
* CONSTANTS[85] is A31 in component IKr (per_millisecond).
* CONSTANTS[86] is B31 in component IKr (per_millivolt).
* CONSTANTS[87] is q31 in component IKr (dimensionless).
* CONSTANTS[88] is A41 in component IKr (per_millisecond).
* CONSTANTS[89] is B41 in component IKr (per_millivolt).
* CONSTANTS[90] is q41 in component IKr (dimensionless).
* CONSTANTS[91] is A51 in component IKr (per_millisecond).
* CONSTANTS[92] is B51 in component IKr (per_millivolt).
* CONSTANTS[93] is q51 in component IKr (dimensionless).
* CONSTANTS[94] is A52 in component IKr (per_millisecond).
* CONSTANTS[95] is B52 in component IKr (per_millivolt).
* CONSTANTS[96] is q52 in component IKr (dimensionless).
* CONSTANTS[97] is A53 in component IKr (per_millisecond).
* CONSTANTS[98] is B53 in component IKr (per_millivolt).
* CONSTANTS[99] is q53 in component IKr (dimensionless).
* CONSTANTS[100] is A61 in component IKr (per_millisecond).
* CONSTANTS[101] is B61 in component IKr (per_millivolt).
* CONSTANTS[102] is q61 in component IKr (dimensionless).
* CONSTANTS[103] is A62 in component IKr (per_millisecond).
* CONSTANTS[104] is B62 in component IKr (per_millivolt).
* CONSTANTS[105] is q62 in component IKr (dimensionless).
* CONSTANTS[106] is A63 in component IKr (per_millisecond).
* CONSTANTS[107] is B63 in component IKr (per_millivolt).
* CONSTANTS[108] is q63 in component IKr (dimensionless).
* CONSTANTS[109] is Kmax in component IKr (dimensionless).
* CONSTANTS[110] is Ku in component IKr (per_millisecond).
* CONSTANTS[111] is n in component IKr (dimensionless).
* CONSTANTS[112] is halfmax in component IKr (dimensionless).
* CONSTANTS[113] is Kt in component IKr (per_millisecond).
* CONSTANTS[114] is Vhalf in component IKr (millivolt).
* CONSTANTS[115] is Temp in component IKr (kelvin).
* CONSTANTS[116] is bGKr in component IKr (dimensionless).
* CONSTANTS[117] is GKs_b in component IKs (milliS_per_microF).
* CONSTANTS[118] is bGKs in component IKs (milliS_per_microF).
* CONSTANTS[119] is EKshift in component IKs (millivolt).
* CONSTANTS[182] is GKs in component IKs (milliS_per_microF).
* ALGEBRAIC[9] is xs1ss in component IKs (dimensionless).
* ALGEBRAIC[23] is xs2ss in component IKs (dimensionless).
* ALGEBRAIC[24] is txs1 in component IKs (millisecond).
* CONSTANTS[120] is txs1_max in component IKs (millisecond).
* STATES[50] is xs1 in component IKs (dimensionless).
* STATES[51] is xs2 in component IKs (dimensionless).
* ALGEBRAIC[148] is KsCa in component IKs (dimensionless).
* ALGEBRAIC[32] is txs2 in component IKs (millisecond).
* CONSTANTS[183] is GK1 in component IK1 (milliS_per_microF).
* CONSTANTS[121] is GK1_b in component IK1 (milliS_per_microF).
* CONSTANTS[122] is bGK1 in component IK1 (dimensionless).
* CONSTANTS[123] is EKshift in component IK1 (millivolt).
* ALGEBRAIC[10] is xk1ss in component IK1 (dimensionless).
* ALGEBRAIC[25] is txk1 in component IK1 (millisecond).
* STATES[52] is xk1 in component IK1 (dimensionless).
* ALGEBRAIC[150] is rk1 in component IK1 (millisecond).
* CONSTANTS[124] is kslope_rk1 in component IK1 (dimensionless).
* CONSTANTS[125] is kna1 in component INaCa_i (per_millisecond).
* CONSTANTS[126] is kna2 in component INaCa_i (per_millisecond).
* CONSTANTS[127] is kna3 in component INaCa_i (per_millisecond).
* CONSTANTS[128] is kasymm in component INaCa_i (dimensionless).
* CONSTANTS[129] is wna in component INaCa_i (dimensionless).
* CONSTANTS[130] is wca in component INaCa_i (dimensionless).
* CONSTANTS[131] is wnaca in component INaCa_i (dimensionless).
* CONSTANTS[132] is kcaon in component INaCa_i (per_millisecond).
* CONSTANTS[133] is kcaoff in component INaCa_i (per_millisecond).
* CONSTANTS[134] is qna in component INaCa_i (dimensionless).
* CONSTANTS[135] is qca in component INaCa_i (dimensionless).
* ALGEBRAIC[153] is hna in component INaCa_i (dimensionless).
* ALGEBRAIC[152] is hca in component INaCa_i (dimensionless).
* CONSTANTS[136] is KmCaAct in component INaCa_i (millimolar).
* CONSTANTS[137] is Gncx_b in component INaCa_i (milliS_per_microF).
* CONSTANTS[138] is bGncx in component INaCa_i (dimensionless).
* CONSTANTS[220] is Gncx in component INaCa_i (milliS_per_microF).
* ALGEBRAIC[154] is h1_i in component INaCa_i (dimensionless).
* ALGEBRAIC[155] is h2_i in component INaCa_i (dimensionless).
* ALGEBRAIC[156] is h3_i in component INaCa_i (dimensionless).
* ALGEBRAIC[157] is h4_i in component INaCa_i (dimensionless).
* ALGEBRAIC[158] is h5_i in component INaCa_i (dimensionless).
* ALGEBRAIC[159] is h6_i in component INaCa_i (dimensionless).
* ALGEBRAIC[160] is h7_i in component INaCa_i (dimensionless).
* ALGEBRAIC[161] is h8_i in component INaCa_i (dimensionless).
* ALGEBRAIC[162] is h9_i in component INaCa_i (dimensionless).
* CONSTANTS[214] is h10_i in component INaCa_i (dimensionless).
* CONSTANTS[215] is h11_i in component INaCa_i (dimensionless).
* CONSTANTS[216] is h12_i in component INaCa_i (dimensionless).
* CONSTANTS[217] is k1_i in component INaCa_i (dimensionless).
* CONSTANTS[218] is k2_i in component INaCa_i (dimensionless).
* ALGEBRAIC[163] is k3p_i in component INaCa_i (dimensionless).
* ALGEBRAIC[164] is k3pp_i in component INaCa_i (dimensionless).
* ALGEBRAIC[165] is k3_i in component INaCa_i (dimensionless).
* ALGEBRAIC[168] is k4_i in component INaCa_i (dimensionless).
* ALGEBRAIC[166] is k4p_i in component INaCa_i (dimensionless).
* ALGEBRAIC[167] is k4pp_i in component INaCa_i (dimensionless).
* CONSTANTS[219] is k5_i in component INaCa_i (dimensionless).
* ALGEBRAIC[169] is k6_i in component INaCa_i (dimensionless).
* ALGEBRAIC[170] is k7_i in component INaCa_i (dimensionless).
* ALGEBRAIC[171] is k8_i in component INaCa_i (dimensionless).
* ALGEBRAIC[172] is x1_i in component INaCa_i (dimensionless).
* ALGEBRAIC[173] is x2_i in component INaCa_i (dimensionless).
* ALGEBRAIC[174] is x3_i in component INaCa_i (dimensionless).
* ALGEBRAIC[175] is x4_i in component INaCa_i (dimensionless).
* ALGEBRAIC[176] is E1_i in component INaCa_i (dimensionless).
* ALGEBRAIC[177] is E2_i in component INaCa_i (dimensionless).
* ALGEBRAIC[178] is E3_i in component INaCa_i (dimensionless).
* ALGEBRAIC[179] is E4_i in component INaCa_i (dimensionless).
* ALGEBRAIC[180] is allo_i in component INaCa_i (dimensionless).
* ALGEBRAIC[181] is JncxNa_i in component INaCa_i (millimolar_per_millisecond).
* ALGEBRAIC[182] is JncxCa_i in component INaCa_i (millimolar_per_millisecond).
* ALGEBRAIC[184] is h1_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[185] is h2_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[186] is h3_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[187] is h4_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[188] is h5_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[189] is h6_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[190] is h7_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[191] is h8_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[192] is h9_ss in component INaCa_i (dimensionless).
* CONSTANTS[221] is h10_ss in component INaCa_i (dimensionless).
* CONSTANTS[222] is h11_ss in component INaCa_i (dimensionless).
* CONSTANTS[223] is h12_ss in component INaCa_i (dimensionless).
* CONSTANTS[224] is k1_ss in component INaCa_i (dimensionless).
* CONSTANTS[225] is k2_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[193] is k3p_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[194] is k3pp_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[195] is k3_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[198] is k4_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[196] is k4p_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[197] is k4pp_ss in component INaCa_i (dimensionless).
* CONSTANTS[226] is k5_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[199] is k6_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[200] is k7_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[201] is k8_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[202] is x1_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[203] is x2_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[204] is x3_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[205] is x4_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[206] is E1_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[207] is E2_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[208] is E3_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[209] is E4_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[210] is allo_ss in component INaCa_i (dimensionless).
* ALGEBRAIC[211] is JncxNa_ss in component INaCa_i (millimolar_per_millisecond).
* ALGEBRAIC[212] is JncxCa_ss in component INaCa_i (millimolar_per_millisecond).
* CONSTANTS[139] is k1p in component INaK (per_millisecond).
* CONSTANTS[140] is k1m in component INaK (per_millisecond).
* CONSTANTS[141] is k2p in component INaK (per_millisecond).
* CONSTANTS[142] is k2m in component INaK (per_millisecond).
* CONSTANTS[143] is k3p in component INaK (per_millisecond).
* CONSTANTS[144] is k3m in component INaK (per_millisecond).
* CONSTANTS[145] is k4p in component INaK (per_millisecond).
* CONSTANTS[146] is k4m in component INaK (per_millisecond).
* CONSTANTS[147] is Knai0 in component INaK (millimolar).
* CONSTANTS[148] is Knao0 in component INaK (millimolar).
* CONSTANTS[149] is delta in component INaK (millivolt).
* CONSTANTS[150] is Kki in component INaK (per_millisecond).
* CONSTANTS[151] is Kko in component INaK (per_millisecond).
* CONSTANTS[152] is MgADP in component INaK (millimolar).
* CONSTANTS[153] is MgATP in component INaK (millimolar).
* CONSTANTS[154] is Kmgatp in component INaK (millimolar).
* CONSTANTS[155] is H in component INaK (millimolar).
* CONSTANTS[156] is eP in component INaK (dimensionless).
* CONSTANTS[157] is Khp in component INaK (millimolar).
* CONSTANTS[158] is Knap in component INaK (millimolar).
* CONSTANTS[159] is Kxkur in component INaK (millimolar).
* CONSTANTS[160] is Pnak_b in component INaK (milliS_per_microF).
* CONSTANTS[230] is Pnak in component INaK (milliS_per_microF).
* CONSTANTS[161] is bGnak in component INaK (dimensionless).
* ALGEBRAIC[214] is Knai in component INaK (millimolar).
* ALGEBRAIC[215] is Knao in component INaK (millimolar).
* ALGEBRAIC[216] is P in component INaK (dimensionless).
* ALGEBRAIC[217] is a1 in component INaK (dimensionless).
* CONSTANTS[227] is b1 in component INaK (dimensionless).
* CONSTANTS[228] is a2 in component INaK (dimensionless).
* ALGEBRAIC[218] is b2 in component INaK (dimensionless).
* ALGEBRAIC[219] is a3 in component INaK (dimensionless).
* ALGEBRAIC[220] is b3 in component INaK (dimensionless).
* CONSTANTS[229] is a4 in component INaK (dimensionless).
* ALGEBRAIC[221] is b4 in component INaK (dimensionless).
* ALGEBRAIC[222] is x1 in component INaK (dimensionless).
* ALGEBRAIC[223] is x2 in component INaK (dimensionless).
* ALGEBRAIC[224] is x3 in component INaK (dimensionless).
* ALGEBRAIC[225] is x4 in component INaK (dimensionless).
* ALGEBRAIC[226] is E1 in component INaK (dimensionless).
* ALGEBRAIC[227] is E2 in component INaK (dimensionless).
* ALGEBRAIC[228] is E3 in component INaK (dimensionless).
* ALGEBRAIC[229] is E4 in component INaK (dimensionless).
* ALGEBRAIC[230] is JnakNa in component INaK (millimolar_per_millisecond).
* ALGEBRAIC[231] is JnakK in component INaK (millimolar_per_millisecond).
* ALGEBRAIC[233] is xkb in component IKb (dimensionless).
* CONSTANTS[162] is GKb_b in component IKb (milliS_per_microF).
* CONSTANTS[185] is GKb in component IKb (milliS_per_microF).
* CONSTANTS[163] is PNab in component INab (milliS_per_microF).
* CONSTANTS[164] is PCab in component ICab (milliS_per_microF).
* CONSTANTS[165] is undo_ICab in component ICab (dimensionless).
* CONSTANTS[166] is GpCa in component IpCa (milliS_per_microF).
* CONSTANTS[167] is KmCap in component IpCa (millimolar).
* CONSTANTS[168] is RyRa1 in component ryr (micromolar).
* CONSTANTS[169] is RyRa2 in component ryr (micromolar).
* CONSTANTS[186] is RyRohalf in component ryr (micromolar).
* CONSTANTS[187] is RyRchalf in component ryr (micromolar).
* ALGEBRAIC[241] is RyRSRCass in component ryr (dimensionless).
* ALGEBRAIC[11] is RyRainfss in component ryr (micromolar).
* CONSTANTS[188] is RyRtauadapt in component ryr (millisecond).
* STATES[53] is RyRa in component ryr (micromolar).
* ALGEBRAIC[12] is RyRoinfss in component ryr (dimensionless).
* CONSTANTS[189] is RyRtauact in component ryr (millisecond).
* ALGEBRAIC[13] is RyRcinfss in component ryr (dimensionless).
* STATES[54] is RyRo in component ryr (dimensionless).
* CONSTANTS[190] is RyRtauinact in component ryr (millisecond).
* STATES[55] is RyRc in component ryr (dimensionless).
* CONSTANTS[201] is RyRtauinactp in component ryr (millisecond).
* STATES[56] is RyRcp in component ryr (dimensionless).
* ALGEBRAIC[242] is fJrelp in component ryr (dimensionless).
* ALGEBRAIC[243] is Jrelnp in component ryr (millimolar_per_millisecond).
* ALGEBRAIC[244] is Jrelp in component ryr (millimolar_per_millisecond).
* CONSTANTS[170] is g_irel_max in component ryr (millimolar_per_second).
* CONSTANTS[191] is g_irel_max_M in component ryr (per_second).
* CONSTANTS[192] is g_irel_max_p in component ryr (per_second).
* CONSTANTS[193] is upScale in component SERCA (dimensionless).
* ALGEBRAIC[246] is Jupnp in component SERCA (millimolar_per_millisecond).
* ALGEBRAIC[247] is Jupp in component SERCA (millimolar_per_millisecond).
* ALGEBRAIC[248] is fJupp in component SERCA (dimensionless).
* CONSTANTS[171] is Jup_b in component SERCA (dimensionless).
* CONSTANTS[172] is cJup in component SERCA (dimensionless).
* CONSTANTS[194] is Vmax_SRCaP in component SERCA (millimolar_per_millisecond).
* CONSTANTS[195] is Kmf in component SERCA (millimolar).
* CONSTANTS[196] is Kmr in component SERCA (millimolar).
* CONSTANTS[197] is hillSRCaP in component SERCA (millimolar).
* ALGEBRAIC[14] is Jup2 in component SERCA (millimolar_per_millisecond).
* RATES[0] is d/dt v in component membrane (millivolt).
* RATES[1] is d/dt CaMKt in component CaMK (millimolar).
* RATES[3] is d/dt nai in component intracellular_ions (millimolar).
* RATES[4] is d/dt nass in component intracellular_ions (millimolar).
* RATES[5] is d/dt ki in component intracellular_ions (millimolar).
* RATES[6] is d/dt kss in component intracellular_ions (millimolar).
* RATES[8] is d/dt cai in component intracellular_ions (millimolar).
* RATES[2] is d/dt cass in component intracellular_ions (millimolar).
* RATES[7] is d/dt casr in component intracellular_ions (millimolar).
* RATES[9] is d/dt m in component INa (dimensionless).
* RATES[10] is d/dt hf in component INa (dimensionless).
* RATES[11] is d/dt hs in component INa (dimensionless).
* RATES[12] is d/dt j in component INa (dimensionless).
* RATES[13] is d/dt hsp in component INa (dimensionless).
* RATES[14] is d/dt jp in component INa (dimensionless).
* RATES[15] is d/dt mL in component INaL (dimensionless).
* RATES[16] is d/dt hL in component INaL (dimensionless).
* RATES[17] is d/dt hLp in component INaL (dimensionless).
* RATES[18] is d/dt a in component Ito (dimensionless).
* RATES[19] is d/dt iF in component Ito (dimensionless).
* RATES[20] is d/dt iS in component Ito (dimensionless).
* RATES[21] is d/dt ap in component Ito (dimensionless).
* RATES[22] is d/dt iFp in component Ito (dimensionless).
* RATES[23] is d/dt iSp in component Ito (dimensionless).
* RATES[25] is d/dt jnca in component ICaL (dimensionless).
* RATES[24] is d/dt nca in component ICaL (dimensionless).
* RATES[38] is d/dt Ok in component ICaL (dimensionless).
* RATES[27] is d/dt I2k in component ICaL (dimensionless).
* RATES[26] is d/dt I1k in component ICaL (dimensionless).
* RATES[28] is d/dt Ck in component ICaL (dimensionless).
* RATES[39] is d/dt Okp in component ICaL (dimensionless).
* RATES[30] is d/dt I2kp in component ICaL (dimensionless).
* RATES[29] is d/dt I1kp in component ICaL (dimensionless).
* RATES[31] is d/dt Ckp in component ICaL (dimensionless).
* RATES[33] is d/dt I2Cak in component ICaL (dimensionless).
* RATES[32] is d/dt I1Cak in component ICaL (dimensionless).
* RATES[34] is d/dt CCak in component ICaL (dimensionless).
* RATES[36] is d/dt I2Cakp in component ICaL (dimensionless).
* RATES[35] is d/dt I1Cakp in component ICaL (dimensionless).
* RATES[37] is d/dt CCakp in component ICaL (dimensionless).
* RATES[40] is d/dt IC1 in component IKr (dimensionless).
* RATES[41] is d/dt IC2 in component IKr (dimensionless).
* RATES[42] is d/dt C1 in component IKr (dimensionless).
* RATES[43] is d/dt C2 in component IKr (dimensionless).
* RATES[44] is d/dt O in component IKr (dimensionless).
* RATES[45] is d/dt IO in component IKr (dimensionless).
* RATES[46] is d/dt IObound in component IKr (dimensionless).
* RATES[47] is d/dt Obound in component IKr (dimensionless).
* RATES[48] is d/dt Cbound in component IKr (dimensionless).
* RATES[49] is d/dt D in component IKr (dimensionless).
* RATES[50] is d/dt xs1 in component IKs (dimensionless).
* RATES[51] is d/dt xs2 in component IKs (dimensionless).
* RATES[52] is d/dt xk1 in component IK1 (dimensionless).
* RATES[53] is d/dt RyRa in component ryr (micromolar).
* RATES[54] is d/dt RyRo in component ryr (dimensionless).
* RATES[55] is d/dt RyRc in component ryr (dimensionless).
* RATES[56] is d/dt RyRcp in component ryr (dimensionless).
*/
void
initConsts(double* CONSTANTS, double* RATES, double *STATES)
{
CONSTANTS[0] = 0;
CONSTANTS[1] = 144;
CONSTANTS[2] = 2.7;
CONSTANTS[3] = 5.4;
CONSTANTS[4] = 8314.0;
CONSTANTS[5] = 310.0;
CONSTANTS[6] = 96485.0;
CONSTANTS[7] = 1.0;
CONSTANTS[8] = 2.0;
CONSTANTS[9] = 1.0;
CONSTANTS[10] = 0.01;
CONSTANTS[11] = 0.0011;
STATES[0] = -87;
CONSTANTS[12] = 3;
CONSTANTS[13] = 0;
CONSTANTS[14] = 999000;
CONSTANTS[15] = -53;
CONSTANTS[16] = 1000;
CONSTANTS[17] = 1;
CONSTANTS[18] = 0.15;
CONSTANTS[19] = 0.05;
CONSTANTS[20] = 0.00068;
CONSTANTS[21] = 0.05;
CONSTANTS[22] = 0.0015;
STATES[1] = 0;
STATES[2] = 1.0e-04;
CONSTANTS[23] = 0.05;
CONSTANTS[24] = 0.00238;
CONSTANTS[25] = 0.07;
CONSTANTS[26] = 0.0005;
CONSTANTS[27] = 0.047;
CONSTANTS[28] = 0.00087;
CONSTANTS[29] = 1.124;
CONSTANTS[30] = 0.0087;
CONSTANTS[31] = 1.0;
CONSTANTS[32] = 0.8;
STATES[3] = 7;
STATES[4] = 7;
STATES[5] = 145;
STATES[6] = 145;
CONSTANTS[33] = 1.50490908825974;
CONSTANTS[34] = 0.821364973867864;
STATES[7] = 1.2;
STATES[8] = 1.0e-04;
CONSTANTS[35] = 1;
CONSTANTS[36] = 0.01833;
CONSTANTS[37] = 8;
CONSTANTS[38] = 1;
CONSTANTS[39] = 0.27;
CONSTANTS[40] = 39.57;
CONSTANTS[41] = 9.871;
CONSTANTS[42] = 11.64;
CONSTANTS[43] = 34.77;
CONSTANTS[44] = 6.765;
CONSTANTS[45] = 8.552;
CONSTANTS[46] = 77.42;
CONSTANTS[47] = 5.955;
STATES[9] = 0;
CONSTANTS[48] = 78.5;
CONSTANTS[49] = 6.22;
CONSTANTS[50] = 0.99;
STATES[10] = 1;
STATES[11] = 1;
CONSTANTS[51] = 75;
STATES[12] = 1;
STATES[13] = 1;
STATES[14] = 1;
CONSTANTS[52] = 2.8;
CONSTANTS[53] = 1;
STATES[15] = 0;
STATES[16] = 1;
STATES[17] = 1;
CONSTANTS[54] = 0.0075;
CONSTANTS[55] = 1;
CONSTANTS[56] = 0.02;
STATES[18] = 0;
STATES[19] = 1;
STATES[20] = 1;
STATES[21] = 0;
STATES[22] = 1;
STATES[23] = 1;
CONSTANTS[57] = 8;
CONSTANTS[58] = 0;
STATES[24] = 0;
CONSTANTS[59] = 1;
STATES[25] = 1;
CONSTANTS[60] = 0.05;
CONSTANTS[61] = 1000;
CONSTANTS[62] = 0.05;
CONSTANTS[63] = 9;
CONSTANTS[64] = 0.0001;
STATES[26] = 0;
STATES[27] = 0;
STATES[28] = 1;
STATES[29] = 0;
STATES[30] = 0;
STATES[31] = 1;
STATES[32] = 0;
STATES[33] = 0;
STATES[34] = 0;
STATES[35] = 0;
STATES[36] = 0;
STATES[37] = 0;
STATES[38] = 0;
STATES[39] = 0;
CONSTANTS[65] = 1;
CONSTANTS[66] = 0.046;
STATES[40] = 0.999637;
STATES[41] = 6.83208e-05;
STATES[42] = 1.80145e-08;
STATES[43] = 8.26619e-05;
STATES[44] = 0.00015551;
STATES[45] = 5.67623e-05;
STATES[46] = 0;
STATES[47] = 0;
STATES[48] = 0;
STATES[49] = 0;
CONSTANTS[67] = 0.0264;
CONSTANTS[68] = 4.631e-05;
CONSTANTS[69] = 4.843;
CONSTANTS[70] = 4.986e-06;
CONSTANTS[71] = -0.004226;
CONSTANTS[72] = 4.23;
CONSTANTS[73] = 0.001214;
CONSTANTS[74] = 0.008516;
CONSTANTS[75] = 4.962;
CONSTANTS[76] = 1.854e-05;
CONSTANTS[77] = -0.04641;
CONSTANTS[78] = 3.769;
CONSTANTS[79] = 0.0007868;
CONSTANTS[80] = 1.535e-08;
CONSTANTS[81] = 4.942;
CONSTANTS[82] = 5.455e-06;
CONSTANTS[83] = -0.1688;
CONSTANTS[84] = 4.156;
CONSTANTS[85] = 0.005509;
CONSTANTS[86] = 7.771e-09;
CONSTANTS[87] = 4.22;
CONSTANTS[88] = 0.001416;
CONSTANTS[89] = -0.02877;
CONSTANTS[90] = 1.459;
CONSTANTS[91] = 0.4492;
CONSTANTS[92] = 0.008595;
CONSTANTS[93] = 5.0;
CONSTANTS[94] = 0.3181;
CONSTANTS[95] = 3.613e-08;
CONSTANTS[96] = 4.663;
CONSTANTS[97] = 0.149;
CONSTANTS[98] = 0.004668;
CONSTANTS[99] = 2.412;
CONSTANTS[100] = 0.01241;
CONSTANTS[101] = 0.1725;
CONSTANTS[102] = 5.568;
CONSTANTS[103] = 0.3226;
CONSTANTS[104] = -0.0006575;
CONSTANTS[105] = 5.0;
CONSTANTS[106] = 0.008978;
CONSTANTS[107] = -0.02215;
CONSTANTS[108] = 5.682;
CONSTANTS[109] = 0;
CONSTANTS[110] = 0;
CONSTANTS[111] = 1.0;
CONSTANTS[112] = 1;
CONSTANTS[113] = 3.5e-5;
CONSTANTS[114] = 1.0;
CONSTANTS[115] = 310.0;
CONSTANTS[116] = 1.2;
CONSTANTS[117] = 0.0034;
CONSTANTS[118] = 2;
CONSTANTS[119] = 8;
CONSTANTS[120] = 817.3;
STATES[50] = 0;
STATES[51] = 0;
CONSTANTS[121] = 0.1908;
CONSTANTS[122] = 0.71;
CONSTANTS[123] = 8;
STATES[52] = 1;
CONSTANTS[124] = 1.09;
CONSTANTS[125] = 15.0;
CONSTANTS[126] = 5.0;
CONSTANTS[127] = 88.12;
CONSTANTS[128] = 12.5;
CONSTANTS[129] = 60000;
CONSTANTS[130] = 60000;
CONSTANTS[131] = 5000;
CONSTANTS[132] = 1500000;
CONSTANTS[133] = 5000;
CONSTANTS[134] = 0.5224;
CONSTANTS[135] = 0.1670;
CONSTANTS[136] = 150e-06;
CONSTANTS[137] = 0.0008;
CONSTANTS[138] = 2.4;
CONSTANTS[139] = 949.5;
CONSTANTS[140] = 182.4;
CONSTANTS[141] = 687.2;
CONSTANTS[142] = 39.4;
CONSTANTS[143] = 1899.0;
CONSTANTS[144] = 79300.0;
CONSTANTS[145] = 639.0;
CONSTANTS[146] = 40.0;
CONSTANTS[147] = 9.073;
CONSTANTS[148] = 27.78;
CONSTANTS[149] = -0.1550;
CONSTANTS[150] = 0.5;
CONSTANTS[151] = 0.3582;
CONSTANTS[152] = 0.05;
CONSTANTS[153] = 9.8;
CONSTANTS[154] = 1.698e-7;
CONSTANTS[155] = 1e-7;
CONSTANTS[156] = 4.2;
CONSTANTS[157] = 1.698e-7;
CONSTANTS[158] = 224.0;
CONSTANTS[159] = 292.0;
CONSTANTS[160] = 30;
CONSTANTS[161] = 2;
CONSTANTS[162] = 0.003;
CONSTANTS[163] = 3.75e-10;
CONSTANTS[164] = 2.5e-8;
CONSTANTS[165] = 0;
CONSTANTS[166] = 0.0005;
CONSTANTS[167] = 0.0005;
CONSTANTS[168] = 0.05;
CONSTANTS[169] = 0.03;
STATES[53] = 0.03;
STATES[54] = 0;
STATES[55] = 1;
STATES[56] = 1;
CONSTANTS[170] = 0.02;
CONSTANTS[171] = 1;
CONSTANTS[172] = 3.13;
CONSTANTS[173] = (CONSTANTS[0]==1.00000 ? CONSTANTS[23]*1.20000 : CONSTANTS[23]);
CONSTANTS[174] = 0.00000;
CONSTANTS[175] = 1.00000 - CONSTANTS[50];
CONSTANTS[176] = 200.000*CONSTANTS[53];
CONSTANTS[177] = (CONSTANTS[0]==1.00000 ? CONSTANTS[54]*CONSTANTS[52]*0.700000 : CONSTANTS[54]*CONSTANTS[52]);
CONSTANTS[178] = (CONSTANTS[0]==1.00000 ? CONSTANTS[55]*CONSTANTS[56]*4.00000 : CONSTANTS[0]==2.00000 ? CONSTANTS[55]*CONSTANTS[56]*4.00000 : CONSTANTS[56]*CONSTANTS[55]);
CONSTANTS[179] = 0.100000*(1.00000 - CONSTANTS[58]);
CONSTANTS[180] = 2.50000;
CONSTANTS[181] = (CONSTANTS[0]==1.00000 ? CONSTANTS[66]*CONSTANTS[116]*1.10000 : CONSTANTS[0]==2.00000 ? CONSTANTS[66]*CONSTANTS[116]*0.800000 : CONSTANTS[66]*CONSTANTS[116]);
CONSTANTS[182] = (CONSTANTS[0]==1.00000 ? CONSTANTS[118]*CONSTANTS[117]*1.40000 : CONSTANTS[118]*CONSTANTS[117]);
CONSTANTS[183] = (CONSTANTS[0]==1.00000 ? CONSTANTS[122]*CONSTANTS[121]*1.20000 : CONSTANTS[0]==2.00000 ? CONSTANTS[122]*CONSTANTS[121]*1.30000 : CONSTANTS[122]*CONSTANTS[121]);
CONSTANTS[184] = 1000.00*3.14160*CONSTANTS[11]*CONSTANTS[11]*CONSTANTS[10];
CONSTANTS[185] = (CONSTANTS[0]==1.00000 ? CONSTANTS[162]*0.600000 : CONSTANTS[162]);
CONSTANTS[186] = 0.120000 - (CONSTANTS[168] - CONSTANTS[169]/2.00000);
CONSTANTS[187] = 0.100000 - (CONSTANTS[168] - CONSTANTS[169]/2.00000);
CONSTANTS[188] = 1000.00;
CONSTANTS[189] = 1.87500/1.87500;
CONSTANTS[190] = ( 2.00000*87.5000)/10.0000;
CONSTANTS[191] = CONSTANTS[170]*1.70000;
CONSTANTS[192] = CONSTANTS[170]*1.25000;
CONSTANTS[193] = (CONSTANTS[0]==1.00000 ? 1.30000 : 1.00000);
CONSTANTS[194] = 1.00000*0.00531140;
CONSTANTS[195] = 0.000246000;
CONSTANTS[196] = 1.70000;
CONSTANTS[197] = 1.78700;
CONSTANTS[231] = 0.00000;
CONSTANTS[198] = 3.00000*CONSTANTS[176];
CONSTANTS[199] = CONSTANTS[181]* pow((CONSTANTS[3]/5.40000), 1.0 / 2);
CONSTANTS[200] = 2.00000*3.14160*CONSTANTS[11]*CONSTANTS[11]+ 2.00000*3.14160*CONSTANTS[11]*CONSTANTS[10];
CONSTANTS[201] = CONSTANTS[190]*1.25000;
CONSTANTS[202] = 2.00000*CONSTANTS[200];
CONSTANTS[203] = 0.680000*CONSTANTS[184];
CONSTANTS[204] = 0.0552000*CONSTANTS[184];
CONSTANTS[205] = 0.00480000*CONSTANTS[184];
CONSTANTS[206] = 0.0200000*CONSTANTS[184];
CONSTANTS[207] = 0.950000*(CONSTANTS[204]+CONSTANTS[205]);
CONSTANTS[208] = (CONSTANTS[0]==1.00000 ? CONSTANTS[64]*0.900000*1.40000 : CONSTANTS[0]==2.00000 ? CONSTANTS[64]*0.900000*2.00000 : CONSTANTS[64]*0.900000);
CONSTANTS[209] = 1.10000*CONSTANTS[208];
CONSTANTS[210] = 0.00125000*CONSTANTS[208];
CONSTANTS[211] = 0.000357400*CONSTANTS[208];
CONSTANTS[212] = 0.00125000*CONSTANTS[209];
CONSTANTS[213] = 0.000357400*CONSTANTS[209];
CONSTANTS[214] = CONSTANTS[128]+1.00000+ (CONSTANTS[1]/CONSTANTS[125])*(1.00000+CONSTANTS[1]/CONSTANTS[126]);
CONSTANTS[215] = ( CONSTANTS[1]*CONSTANTS[1])/( CONSTANTS[214]*CONSTANTS[125]*CONSTANTS[126]);
CONSTANTS[216] = 1.00000/CONSTANTS[214];
CONSTANTS[217] = CONSTANTS[216]*CONSTANTS[2]*CONSTANTS[132];
CONSTANTS[218] = CONSTANTS[133];
CONSTANTS[219] = CONSTANTS[133];
CONSTANTS[220] = (CONSTANTS[0]==1.00000 ? CONSTANTS[138]*CONSTANTS[137]*1.20000 : CONSTANTS[0]==2.00000 ? CONSTANTS[138]*CONSTANTS[137]*1.40000 : CONSTANTS[138]*CONSTANTS[137]);
CONSTANTS[221] = CONSTANTS[128]+1.00000+ (CONSTANTS[1]/CONSTANTS[125])*(1.00000+CONSTANTS[1]/CONSTANTS[126]);
CONSTANTS[222] = ( CONSTANTS[1]*CONSTANTS[1])/( CONSTANTS[221]*CONSTANTS[125]*CONSTANTS[126]);
CONSTANTS[223] = 1.00000/CONSTANTS[221];
CONSTANTS[224] = CONSTANTS[223]*CONSTANTS[2]*CONSTANTS[132];
CONSTANTS[225] = CONSTANTS[133];
CONSTANTS[226] = CONSTANTS[133];
CONSTANTS[227] = CONSTANTS[140]*CONSTANTS[152];
CONSTANTS[228] = CONSTANTS[141];
CONSTANTS[229] = (( CONSTANTS[145]*CONSTANTS[153])/CONSTANTS[154])/(1.00000+CONSTANTS[153]/CONSTANTS[154]);
CONSTANTS[230] = (CONSTANTS[0]==1.00000 ? CONSTANTS[161]*CONSTANTS[160]*0.900000 : CONSTANTS[0]==2.00000 ? CONSTANTS[161]*CONSTANTS[160]*0.700000 : CONSTANTS[161]*CONSTANTS[160]);
}
void
computeRates(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
RATES[49] = CONSTANTS[231];
RATES[40] = (- ( CONSTANTS[79]*exp( CONSTANTS[80]*STATES[0])*STATES[40]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[81]))/10.0000) - CONSTANTS[82]*exp( CONSTANTS[83]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[84]))/10.0000))+ CONSTANTS[91]*exp( CONSTANTS[92]*STATES[0])*STATES[42]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[93]))/10.0000)) - CONSTANTS[100]*exp( CONSTANTS[101]*STATES[0])*STATES[40]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[102]))/10.0000);
RATES[41] = ((( CONSTANTS[79]*exp( CONSTANTS[80]*STATES[0])*STATES[40]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[81]))/10.0000) - CONSTANTS[82]*exp( CONSTANTS[83]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[84]))/10.0000)) - ( CONSTANTS[73]*exp( CONSTANTS[74]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[75]))/10.0000) - CONSTANTS[76]*exp( CONSTANTS[77]*STATES[0])*STATES[45]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[78]))/10.0000)))+ CONSTANTS[94]*exp( CONSTANTS[95]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[96]))/10.0000)) - CONSTANTS[103]*exp( CONSTANTS[104]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[105]))/10.0000);
RATES[42] = - ( CONSTANTS[67]*exp( CONSTANTS[68]*STATES[0])*STATES[42]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[69]))/10.0000) - CONSTANTS[70]*exp( CONSTANTS[71]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[72]))/10.0000)) - ( CONSTANTS[91]*exp( CONSTANTS[92]*STATES[0])*STATES[42]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[93]))/10.0000) - CONSTANTS[100]*exp( CONSTANTS[101]*STATES[0])*STATES[40]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[102]))/10.0000));
RATES[43] = (( CONSTANTS[67]*exp( CONSTANTS[68]*STATES[0])*STATES[42]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[69]))/10.0000) - CONSTANTS[70]*exp( CONSTANTS[71]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[72]))/10.0000)) - ( CONSTANTS[85]*exp( CONSTANTS[86]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[87]))/10.0000) - CONSTANTS[88]*exp( CONSTANTS[89]*STATES[0])*STATES[44]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[90]))/10.0000))) - ( CONSTANTS[94]*exp( CONSTANTS[95]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[96]))/10.0000) - CONSTANTS[103]*exp( CONSTANTS[104]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[105]))/10.0000));
RATES[44] = (( CONSTANTS[85]*exp( CONSTANTS[86]*STATES[0])*STATES[43]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[87]))/10.0000) - CONSTANTS[88]*exp( CONSTANTS[89]*STATES[0])*STATES[44]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[90]))/10.0000)) - ( CONSTANTS[97]*exp( CONSTANTS[98]*STATES[0])*STATES[44]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[99]))/10.0000) - CONSTANTS[106]*exp( CONSTANTS[107]*STATES[0])*STATES[45]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[108]))/10.0000))) - ( (( CONSTANTS[109]*CONSTANTS[110]*exp( CONSTANTS[111]*log(STATES[49])))/(exp( CONSTANTS[111]*log(STATES[49]))+CONSTANTS[112]))*STATES[44] - CONSTANTS[110]*STATES[47]);
RATES[45] = ((( CONSTANTS[73]*exp( CONSTANTS[74]*STATES[0])*STATES[41]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[75]))/10.0000) - CONSTANTS[76]*exp( CONSTANTS[77]*STATES[0])*STATES[45]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[78]))/10.0000))+ CONSTANTS[97]*exp( CONSTANTS[98]*STATES[0])*STATES[44]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[99]))/10.0000)) - CONSTANTS[106]*exp( CONSTANTS[107]*STATES[0])*STATES[45]*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[108]))/10.0000)) - ( (( CONSTANTS[109]*CONSTANTS[110]*exp( CONSTANTS[111]*log(STATES[49])))/(exp( CONSTANTS[111]*log(STATES[49]))+CONSTANTS[112]))*STATES[45] - (( CONSTANTS[110]*CONSTANTS[97]*exp( CONSTANTS[98]*STATES[0])*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[99]))/10.0000))/( CONSTANTS[106]*exp( CONSTANTS[107]*STATES[0])*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[108]))/10.0000)))*STATES[46]);
RATES[46] = (( (( CONSTANTS[109]*CONSTANTS[110]*exp( CONSTANTS[111]*log(STATES[49])))/(exp( CONSTANTS[111]*log(STATES[49]))+CONSTANTS[112]))*STATES[45] - (( CONSTANTS[110]*CONSTANTS[97]*exp( CONSTANTS[98]*STATES[0])*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[99]))/10.0000))/( CONSTANTS[106]*exp( CONSTANTS[107]*STATES[0])*exp(( (CONSTANTS[115] - 293.000)*log(CONSTANTS[108]))/10.0000)))*STATES[46])+ (CONSTANTS[113]/(1.00000+exp(- (STATES[0] - CONSTANTS[114])/6.78900)))*STATES[48]) - CONSTANTS[113]*STATES[46];
RATES[47] = (( (( CONSTANTS[109]*CONSTANTS[110]*exp( CONSTANTS[111]*log(STATES[49])))/(exp( CONSTANTS[111]*log(STATES[49]))+CONSTANTS[112]))*STATES[44] - CONSTANTS[110]*STATES[47])+ (CONSTANTS[113]/(1.00000+exp(- (STATES[0] - CONSTANTS[114])/6.78900)))*STATES[48]) - CONSTANTS[113]*STATES[47];
RATES[48] = - ( (CONSTANTS[113]/(1.00000+exp(- (STATES[0] - CONSTANTS[114])/6.78900)))*STATES[48] - CONSTANTS[113]*STATES[47]) - ( (CONSTANTS[113]/(1.00000+exp(- (STATES[0] - CONSTANTS[114])/6.78900)))*STATES[48] - CONSTANTS[113]*STATES[46]);
ALGEBRAIC[2] = 1.00000/(1.00000+exp((STATES[0]+87.6100)/7.48800));
RATES[16] = (ALGEBRAIC[2] - STATES[16])/CONSTANTS[176];
ALGEBRAIC[3] = 1.00000/(1.00000+exp((STATES[0]+93.8100)/7.48800));
RATES[17] = (ALGEBRAIC[3] - STATES[17])/CONSTANTS[198];
ALGEBRAIC[6] = 1.00000/(1.00000+exp((STATES[0]+19.5800+25.0000)/3.69600));
RATES[25] = (ALGEBRAIC[6] - STATES[25])/CONSTANTS[59];
ALGEBRAIC[11] = CONSTANTS[168] - CONSTANTS[169]/(1.00000+exp(( 1000.00*STATES[2] - 0.0430000)/0.00820000));
RATES[53] = (ALGEBRAIC[11] - STATES[53])/CONSTANTS[188];
ALGEBRAIC[12] = 1.00000 - 1.00000/(1.00000+exp(( 1000.00*STATES[2] - (STATES[53]+CONSTANTS[186]))/0.00300000));
RATES[54] = (ALGEBRAIC[12] - STATES[54])/CONSTANTS[189];
ALGEBRAIC[13] = 1.00000/(1.00000+exp(( 1000.00*STATES[2] - (STATES[53]+CONSTANTS[187]))/0.00100000));
RATES[55] = (ALGEBRAIC[13] - STATES[55])/CONSTANTS[190];
RATES[56] = (ALGEBRAIC[13] - STATES[56])/CONSTANTS[201];
ALGEBRAIC[0] = 1.00000/(1.00000+exp(- (STATES[0]+CONSTANTS[40])/CONSTANTS[41]));
ALGEBRAIC[15] = 1.00000/( CONSTANTS[44]*exp((STATES[0]+CONSTANTS[42])/CONSTANTS[43])+ CONSTANTS[45]*exp(- (STATES[0]+CONSTANTS[46])/CONSTANTS[47]));
RATES[9] = (ALGEBRAIC[0] - STATES[9])/ALGEBRAIC[15];
ALGEBRAIC[1] = 1.00000/(1.00000+exp((STATES[0]+CONSTANTS[48])/CONSTANTS[49]));
ALGEBRAIC[16] = 1.00000/( 3.68600e-06*exp(- (STATES[0]+3.88750)/7.85790)+ 16.0000*exp((STATES[0] - 0.496300)/9.18430))+0.0750000;
RATES[10] = (ALGEBRAIC[1] - STATES[10])/ALGEBRAIC[16];
ALGEBRAIC[17] = 1.00000/( 0.00979400*exp(- (STATES[0]+17.9500)/28.0500)+ 0.334300*exp((STATES[0]+5.73000)/56.6600));
RATES[11] = (ALGEBRAIC[1] - STATES[11])/ALGEBRAIC[17];
ALGEBRAIC[4] = 1.00000/(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 14.3400)/14.8200));
ALGEBRAIC[19] = 1.05150/(1.00000/( 1.20890*(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 18.4099)/29.3814)))+3.50000/(1.00000+exp((STATES[0]+CONSTANTS[57]+100.000)/29.3814)));
RATES[18] = (ALGEBRAIC[4] - STATES[18])/ALGEBRAIC[19];
ALGEBRAIC[7] = STATES[25]*150.000;
ALGEBRAIC[21] = (1.00000 - STATES[24])/pow(1.00000+CONSTANTS[60]/STATES[2], 4.00000);
RATES[24] = ALGEBRAIC[21]*CONSTANTS[61] - STATES[24]*ALGEBRAIC[7];
ALGEBRAIC[9] = 1.00000/(1.00000+exp(- (STATES[0]+11.6000+CONSTANTS[119])/8.93200));
ALGEBRAIC[24] = 817.300+1.00000/( 0.000232600*exp((STATES[0]+48.2800+CONSTANTS[119])/17.8000)+ 0.00129200*exp(- (STATES[0]+210.000+CONSTANTS[119])/230.000));
RATES[50] = (ALGEBRAIC[9] - STATES[50])/ALGEBRAIC[24];
ALGEBRAIC[10] = 1.00000/(1.00000+exp(- (STATES[0]+ 2.55380*CONSTANTS[3]+144.590+CONSTANTS[123])/( 1.56920*CONSTANTS[3]+3.81150)));
ALGEBRAIC[25] = 122.200/(exp(- (STATES[0]+CONSTANTS[123]+127.200)/20.3600)+exp((STATES[0]+CONSTANTS[123]+236.800)/69.3300));
RATES[52] = (ALGEBRAIC[10] - STATES[52])/ALGEBRAIC[25];
ALGEBRAIC[18] = ALGEBRAIC[1];
ALGEBRAIC[26] = (4.85900+1.00000/( 0.862800*exp(- (STATES[0]+116.726)/7.60050)+ 1.10960*exp((STATES[0]+6.27190)/9.03580)))*CONSTANTS[38];
RATES[12] = (ALGEBRAIC[18] - STATES[12])/ALGEBRAIC[26];
ALGEBRAIC[30] = 1.00000/(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 24.3400)/14.8200));
RATES[21] = (ALGEBRAIC[30] - STATES[21])/ALGEBRAIC[19];
ALGEBRAIC[23] = ALGEBRAIC[9];
ALGEBRAIC[32] = 1.00000/( 0.0100000*exp(((STATES[0] - 50.0000)+CONSTANTS[119])/20.0000)+ 0.0193000*exp(- (STATES[0]+66.5400+CONSTANTS[119])/31.0000));
RATES[51] = (ALGEBRAIC[23] - STATES[51])/ALGEBRAIC[32];
ALGEBRAIC[37] = ( CONSTANTS[21]*(1.00000 - STATES[1]))/(1.00000+CONSTANTS[22]/STATES[2]);
RATES[1] = CONSTANTS[19]*ALGEBRAIC[37]*(ALGEBRAIC[37]+STATES[1]) - CONSTANTS[20]*STATES[1];
ALGEBRAIC[27] = 1.00000/(1.00000+exp((STATES[0]+84.7000)/6.22000));
ALGEBRAIC[33] = 3.00000*ALGEBRAIC[17];
RATES[13] = (ALGEBRAIC[27] - STATES[13])/ALGEBRAIC[33];
ALGEBRAIC[34] = 1.46000*ALGEBRAIC[26];
RATES[14] = (ALGEBRAIC[18] - STATES[14])/ALGEBRAIC[34];
ALGEBRAIC[28] = 1.00000/(1.00000+exp(- (STATES[0]+42.8500)/5.26400));
ALGEBRAIC[35] = ALGEBRAIC[15];
RATES[15] = (ALGEBRAIC[28] - STATES[15])/ALGEBRAIC[35];
ALGEBRAIC[5] = 1.00000/(1.00000+exp((STATES[0]+CONSTANTS[57]+43.9400)/5.71100));
ALGEBRAIC[20] = (CONSTANTS[0]==1.00000 ? 1.00000 - 0.950000/(1.00000+exp((STATES[0]+CONSTANTS[57]+70.0000)/5.00000)) : 1.00000);
ALGEBRAIC[29] = 4.56200+1.00000/( 0.393300*exp(- (STATES[0]+CONSTANTS[57]+100.000)/100.000)+ 0.0800400*exp((STATES[0]+CONSTANTS[57]+50.0000)/16.5900));
ALGEBRAIC[38] = ALGEBRAIC[29]*ALGEBRAIC[20];
RATES[19] = (ALGEBRAIC[5] - STATES[19])/ALGEBRAIC[38];
ALGEBRAIC[36] = 23.6200+1.00000/( 0.00141600*exp(- (STATES[0]+CONSTANTS[57]+96.5200)/59.0500)+ 1.78000e-08*exp((STATES[0]+CONSTANTS[57]+114.100)/8.07900));
ALGEBRAIC[40] = ALGEBRAIC[36]*ALGEBRAIC[20];
RATES[20] = (ALGEBRAIC[5] - STATES[20])/ALGEBRAIC[40];
ALGEBRAIC[42] = 1.35400+0.000100000/(exp(((STATES[0]+CONSTANTS[57]) - 167.400)/15.8900)+exp(- ((STATES[0]+CONSTANTS[57]) - 12.2300)/0.215400));
ALGEBRAIC[44] = 1.00000 - 0.500000/(1.00000+exp((STATES[0]+CONSTANTS[57]+70.0000)/20.0000));
ALGEBRAIC[46] = ALGEBRAIC[42]*ALGEBRAIC[44]*ALGEBRAIC[38];
RATES[22] = (ALGEBRAIC[5] - STATES[22])/ALGEBRAIC[46];
ALGEBRAIC[47] = ALGEBRAIC[42]*ALGEBRAIC[44]*ALGEBRAIC[40];
RATES[23] = (ALGEBRAIC[5] - STATES[23])/ALGEBRAIC[47];
ALGEBRAIC[64] = (( CONSTANTS[179]*STATES[24])/(1.00000 - STATES[24]))*(1.00000 - CONSTANTS[58]);
ALGEBRAIC[65] = 1.00000/(1.00000+exp(- (STATES[0]+3.94000)/4.23000));
ALGEBRAIC[66] = 0.600000+1.00000/(exp( - 0.0500000*(STATES[0]+6.00000))+exp( 0.0900000*(STATES[0]+14.0000)));
ALGEBRAIC[67] = ALGEBRAIC[65]/ALGEBRAIC[66];
ALGEBRAIC[68] = (1.00000 - ALGEBRAIC[65])/ALGEBRAIC[66];
ALGEBRAIC[69] = 1.00000/(1.00000+exp((STATES[0]+19.5800)/3.69600));
ALGEBRAIC[70] = ALGEBRAIC[69];
ALGEBRAIC[74] = 35.0000+ 350.000*exp(- pow(STATES[0]+20.0000, 2.00000)/( 2.00000*100.000));
ALGEBRAIC[75] = ALGEBRAIC[74];
ALGEBRAIC[79] = ALGEBRAIC[70]/ALGEBRAIC[75];
ALGEBRAIC[83] = (1.00000 - ALGEBRAIC[70])/ALGEBRAIC[75];
RATES[28] = ((( ALGEBRAIC[68]*STATES[38]+ ALGEBRAIC[79]*STATES[27]) - (ALGEBRAIC[83]+ALGEBRAIC[67])*STATES[28]) - ALGEBRAIC[64]*STATES[28])+ CONSTANTS[179]*STATES[34];
ALGEBRAIC[72] = ALGEBRAIC[69];
ALGEBRAIC[77] = ALGEBRAIC[74];
ALGEBRAIC[80] = ALGEBRAIC[72]/ALGEBRAIC[77];
ALGEBRAIC[84] = (1.00000 - ALGEBRAIC[72])/ALGEBRAIC[77];
RATES[31] = ((( ALGEBRAIC[68]*STATES[39]+ ALGEBRAIC[80]*STATES[30]) - (ALGEBRAIC[84]+ALGEBRAIC[67])*STATES[31]) - ALGEBRAIC[64]*STATES[31])+ CONSTANTS[179]*STATES[37];
ALGEBRAIC[87] = 0.800000/(1.00000+exp((STATES[0]+19.5800)/3.69600))+0.200000;
ALGEBRAIC[88] = 1.00000*(70.0000+1.20000/( 0.00450000*exp((STATES[0]+20.0000)/- 50.0000)+ 0.00450000*exp((STATES[0]+30.0000)/10.0000)));
ALGEBRAIC[89] = (1.00000 - ALGEBRAIC[87])/ALGEBRAIC[88];
ALGEBRAIC[90] = ALGEBRAIC[87]/ALGEBRAIC[88];
ALGEBRAIC[101] = 1.00000*(100.000+0.00000/( 0.00350000*exp((STATES[0]+5.00000)/- 84.0000)+ 0.00350000*exp((STATES[0]+5.00000)/4.00000)));
ALGEBRAIC[103] = ALGEBRAIC[101];
ALGEBRAIC[104] = (( ALGEBRAIC[67]*ALGEBRAIC[89]*ALGEBRAIC[79])/ALGEBRAIC[103])/( ALGEBRAIC[67]*ALGEBRAIC[89]*ALGEBRAIC[79]+ ALGEBRAIC[68]*ALGEBRAIC[90]*ALGEBRAIC[83]);
ALGEBRAIC[107] = 1.00000/ALGEBRAIC[103] - ALGEBRAIC[104];
RATES[27] = ((( ALGEBRAIC[107]*STATES[26]+ ALGEBRAIC[83]*STATES[28]) - (ALGEBRAIC[104]+ALGEBRAIC[79])*STATES[27]) - ALGEBRAIC[64]*STATES[27])+ CONSTANTS[179]*STATES[33];
RATES[26] = ((( ALGEBRAIC[104]*STATES[27]+ ALGEBRAIC[89]*STATES[38]) - (ALGEBRAIC[107]+ALGEBRAIC[90])*STATES[26]) - ALGEBRAIC[64]*STATES[26])+ CONSTANTS[179]*STATES[32];
ALGEBRAIC[93] = ALGEBRAIC[89]/CONSTANTS[180];
ALGEBRAIC[94] = ALGEBRAIC[90]/CONSTANTS[180];
ALGEBRAIC[102] = ALGEBRAIC[101]*CONSTANTS[180];
ALGEBRAIC[105] = (( ALGEBRAIC[67]*ALGEBRAIC[93]*ALGEBRAIC[80])/ALGEBRAIC[102])/( ALGEBRAIC[67]*ALGEBRAIC[93]*ALGEBRAIC[80]+ ALGEBRAIC[68]*ALGEBRAIC[94]*ALGEBRAIC[84]);
ALGEBRAIC[108] = 1.00000/ALGEBRAIC[102] - ALGEBRAIC[105];
RATES[30] = ((( ALGEBRAIC[108]*STATES[29]+ ALGEBRAIC[84]*STATES[31]) - (ALGEBRAIC[105]+ALGEBRAIC[80])*STATES[30]) - ALGEBRAIC[64]*STATES[30])+ CONSTANTS[179]*STATES[36];
RATES[29] = ((( ALGEBRAIC[105]*STATES[30]+ ALGEBRAIC[93]*STATES[39]) - (ALGEBRAIC[108]+ALGEBRAIC[94])*STATES[29]) - ALGEBRAIC[64]*STATES[29])+ CONSTANTS[179]*STATES[35];
ALGEBRAIC[71] = ALGEBRAIC[69];
ALGEBRAIC[76] = ALGEBRAIC[74];
ALGEBRAIC[81] = ALGEBRAIC[71]/ALGEBRAIC[76];
ALGEBRAIC[85] = (1.00000 - ALGEBRAIC[71])/ALGEBRAIC[76];
ALGEBRAIC[95] = ALGEBRAIC[89]*CONSTANTS[63];
ALGEBRAIC[96] = ALGEBRAIC[90]*CONSTANTS[63];
ALGEBRAIC[106] = ALGEBRAIC[103]/CONSTANTS[63];
ALGEBRAIC[112] = (( ALGEBRAIC[67]*ALGEBRAIC[95]*ALGEBRAIC[81])/ALGEBRAIC[106])/( ALGEBRAIC[67]*ALGEBRAIC[95]*ALGEBRAIC[81]+ ALGEBRAIC[68]*ALGEBRAIC[96]*ALGEBRAIC[85]);
ALGEBRAIC[114] = 1.00000/ALGEBRAIC[106] - ALGEBRAIC[112];
RATES[33] = ((( ALGEBRAIC[114]*STATES[32]+ ALGEBRAIC[85]*STATES[34]) - (ALGEBRAIC[112]+ALGEBRAIC[81])*STATES[33])+ ALGEBRAIC[64]*STATES[27]) - CONSTANTS[179]*STATES[33];
ALGEBRAIC[73] = ALGEBRAIC[69];
ALGEBRAIC[78] = ALGEBRAIC[74];
ALGEBRAIC[82] = ALGEBRAIC[73]/ALGEBRAIC[78];
ALGEBRAIC[86] = (1.00000 - ALGEBRAIC[73])/ALGEBRAIC[78];
ALGEBRAIC[99] = ALGEBRAIC[93]*CONSTANTS[63];
ALGEBRAIC[100] = ALGEBRAIC[94]*CONSTANTS[63];
ALGEBRAIC[109] = (ALGEBRAIC[103]/CONSTANTS[63])*CONSTANTS[180];
ALGEBRAIC[113] = (( ALGEBRAIC[67]*ALGEBRAIC[99]*ALGEBRAIC[82])/ALGEBRAIC[109])/( ALGEBRAIC[67]*ALGEBRAIC[99]*ALGEBRAIC[82]+ ALGEBRAIC[68]*ALGEBRAIC[100]*ALGEBRAIC[86]);
ALGEBRAIC[115] = 1.00000/ALGEBRAIC[109] - ALGEBRAIC[113];
RATES[36] = ((( ALGEBRAIC[115]*STATES[35]+ ALGEBRAIC[86]*STATES[37]) - (ALGEBRAIC[113]+ALGEBRAIC[82])*STATES[36])+ ALGEBRAIC[64]*STATES[30]) - CONSTANTS[179]*STATES[36];
ALGEBRAIC[121] = ((((((1.00000 - STATES[34]) - STATES[32]) - STATES[33]) - STATES[28]) - STATES[26]) - STATES[27]) - STATES[38];
RATES[38] = ((( ALGEBRAIC[67]*STATES[28]+ ALGEBRAIC[90]*STATES[26]) - (ALGEBRAIC[68]+ALGEBRAIC[89])*STATES[38]) - ALGEBRAIC[64]*STATES[38])+ CONSTANTS[179]*ALGEBRAIC[121];
RATES[32] = ((( ALGEBRAIC[112]*STATES[33]+ ALGEBRAIC[95]*ALGEBRAIC[121]) - (ALGEBRAIC[114]+ALGEBRAIC[96])*STATES[32])+ ALGEBRAIC[64]*STATES[26]) - CONSTANTS[179]*STATES[32];
RATES[34] = ((( ALGEBRAIC[68]*ALGEBRAIC[121]+ ALGEBRAIC[81]*STATES[33]) - (ALGEBRAIC[85]+ALGEBRAIC[67])*STATES[34])+ ALGEBRAIC[64]*STATES[28]) - CONSTANTS[179]*STATES[34];
ALGEBRAIC[122] = ((((((1.00000 - STATES[37]) - STATES[35]) - STATES[36]) - STATES[31]) - STATES[29]) - STATES[30]) - STATES[39];
RATES[39] = ((( ALGEBRAIC[67]*STATES[31]+ ALGEBRAIC[94]*STATES[29]) - (ALGEBRAIC[68]+ALGEBRAIC[93])*STATES[39]) - ALGEBRAIC[64]*STATES[39])+ CONSTANTS[179]*ALGEBRAIC[122];
RATES[35] = ((( ALGEBRAIC[113]*STATES[36]+ ALGEBRAIC[99]*ALGEBRAIC[122]) - (ALGEBRAIC[115]+ALGEBRAIC[100])*STATES[35])+ ALGEBRAIC[64]*STATES[29]) - CONSTANTS[179]*STATES[35];
RATES[37] = ((( ALGEBRAIC[68]*ALGEBRAIC[122]+ ALGEBRAIC[82]*STATES[36]) - (ALGEBRAIC[86]+ALGEBRAIC[67])*STATES[37])+ ALGEBRAIC[64]*STATES[31]) - CONSTANTS[179]*STATES[37];
ALGEBRAIC[49] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log(CONSTANTS[3]/STATES[5]);
ALGEBRAIC[57] = 1.00000/(1.00000+exp(((STATES[0]+CONSTANTS[57]) - 213.600)/151.200));
ALGEBRAIC[58] = 1.00000 - ALGEBRAIC[57];
ALGEBRAIC[59] = ALGEBRAIC[57]*STATES[19]+ ALGEBRAIC[58]*STATES[20];
ALGEBRAIC[60] = ALGEBRAIC[57]*STATES[22]+ ALGEBRAIC[58]*STATES[23];
ALGEBRAIC[39] = ALGEBRAIC[37]+STATES[1];
ALGEBRAIC[61] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[62] = CONSTANTS[178]*(STATES[0] - ALGEBRAIC[49])*( (1.00000 - ALGEBRAIC[61])*STATES[18]*ALGEBRAIC[59]+ ALGEBRAIC[61]*STATES[21]*ALGEBRAIC[60]);
ALGEBRAIC[147] = CONSTANTS[199]*STATES[44]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[50] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log((CONSTANTS[3]+ CONSTANTS[36]*CONSTANTS[1])/(STATES[5]+ CONSTANTS[36]*STATES[3]));
ALGEBRAIC[148] = 1.00000+0.600000/(1.00000+pow(3.80000e-05/STATES[8], 1.40000));
ALGEBRAIC[149] = CONSTANTS[182]*ALGEBRAIC[148]*STATES[50]*STATES[51]*(STATES[0] - ALGEBRAIC[50]);
ALGEBRAIC[150] = 1.00000/(1.00000+exp((((STATES[0]+105.800) - 2.60000*CONSTANTS[3])+CONSTANTS[123])/( CONSTANTS[124]*9.49300)));
ALGEBRAIC[151] = CONSTANTS[183]* pow(CONSTANTS[3], 1.0 / 2)*ALGEBRAIC[150]*STATES[52]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[215] = CONSTANTS[148]*exp(( (1.00000 - CONSTANTS[149])*STATES[0]*CONSTANTS[6])/( 3.00000*CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[219] = ( CONSTANTS[143]*pow(CONSTANTS[3]/CONSTANTS[151], 2.00000))/((pow(1.00000+CONSTANTS[1]/ALGEBRAIC[215], 3.00000)+pow(1.00000+CONSTANTS[3]/CONSTANTS[151], 2.00000)) - 1.00000);
ALGEBRAIC[216] = CONSTANTS[156]/(1.00000+CONSTANTS[155]/CONSTANTS[157]+STATES[3]/CONSTANTS[158]+STATES[5]/CONSTANTS[159]);
ALGEBRAIC[220] = ( CONSTANTS[144]*ALGEBRAIC[216]*CONSTANTS[155])/(1.00000+CONSTANTS[153]/CONSTANTS[154]);
ALGEBRAIC[214] = CONSTANTS[147]*exp(( CONSTANTS[149]*STATES[0]*CONSTANTS[6])/( 3.00000*CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[217] = ( CONSTANTS[139]*pow(STATES[3]/ALGEBRAIC[214], 3.00000))/((pow(1.00000+STATES[3]/ALGEBRAIC[214], 3.00000)+pow(1.00000+STATES[5]/CONSTANTS[150], 2.00000)) - 1.00000);
ALGEBRAIC[218] = ( CONSTANTS[142]*pow(CONSTANTS[1]/ALGEBRAIC[215], 3.00000))/((pow(1.00000+CONSTANTS[1]/ALGEBRAIC[215], 3.00000)+pow(1.00000+CONSTANTS[3]/CONSTANTS[151], 2.00000)) - 1.00000);
ALGEBRAIC[221] = ( CONSTANTS[146]*pow(STATES[5]/CONSTANTS[150], 2.00000))/((pow(1.00000+STATES[3]/ALGEBRAIC[214], 3.00000)+pow(1.00000+STATES[5]/CONSTANTS[150], 2.00000)) - 1.00000);
ALGEBRAIC[222] = CONSTANTS[229]*ALGEBRAIC[217]*CONSTANTS[228]+ ALGEBRAIC[218]*ALGEBRAIC[221]*ALGEBRAIC[220]+ CONSTANTS[228]*ALGEBRAIC[221]*ALGEBRAIC[220]+ ALGEBRAIC[220]*ALGEBRAIC[217]*CONSTANTS[228];
ALGEBRAIC[223] = ALGEBRAIC[218]*CONSTANTS[227]*ALGEBRAIC[221]+ ALGEBRAIC[217]*CONSTANTS[228]*ALGEBRAIC[219]+ ALGEBRAIC[219]*CONSTANTS[227]*ALGEBRAIC[221]+ CONSTANTS[228]*ALGEBRAIC[219]*ALGEBRAIC[221];
ALGEBRAIC[224] = CONSTANTS[228]*ALGEBRAIC[219]*CONSTANTS[229]+ ALGEBRAIC[220]*ALGEBRAIC[218]*CONSTANTS[227]+ ALGEBRAIC[218]*CONSTANTS[227]*CONSTANTS[229]+ ALGEBRAIC[219]*CONSTANTS[229]*CONSTANTS[227];
ALGEBRAIC[225] = ALGEBRAIC[221]*ALGEBRAIC[220]*ALGEBRAIC[218]+ ALGEBRAIC[219]*CONSTANTS[229]*ALGEBRAIC[217]+ ALGEBRAIC[218]*CONSTANTS[229]*ALGEBRAIC[217]+ ALGEBRAIC[220]*ALGEBRAIC[218]*ALGEBRAIC[217];
ALGEBRAIC[226] = ALGEBRAIC[222]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[227] = ALGEBRAIC[223]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[230] = 3.00000*( ALGEBRAIC[226]*ALGEBRAIC[219] - ALGEBRAIC[227]*ALGEBRAIC[220]);
ALGEBRAIC[228] = ALGEBRAIC[224]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[229] = ALGEBRAIC[225]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[231] = 2.00000*( ALGEBRAIC[229]*CONSTANTS[227] - ALGEBRAIC[228]*ALGEBRAIC[217]);
ALGEBRAIC[232] = CONSTANTS[230]*( CONSTANTS[7]*ALGEBRAIC[230]+ CONSTANTS[9]*ALGEBRAIC[231]);
ALGEBRAIC[233] = 1.00000/(1.00000+exp(- (STATES[0] - 14.4800)/18.3400));
ALGEBRAIC[234] = CONSTANTS[185]*ALGEBRAIC[233]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[8] = (VOI>=CONSTANTS[13]&&VOI<=CONSTANTS[14]&&(VOI - CONSTANTS[13]) - floor((VOI - CONSTANTS[13])/CONSTANTS[16])*CONSTANTS[16]<=CONSTANTS[17] ? CONSTANTS[15] : 0.00000);
ALGEBRAIC[236] = (STATES[6] - STATES[5])/2.00000;
RATES[5] = ( - ((ALGEBRAIC[62]+ALGEBRAIC[147]+ALGEBRAIC[149]+ALGEBRAIC[151]+ALGEBRAIC[234]+ALGEBRAIC[8]) - 2.00000*ALGEBRAIC[232])*CONSTANTS[35]*CONSTANTS[202])/( CONSTANTS[6]*CONSTANTS[203])+( ALGEBRAIC[236]*CONSTANTS[206])/CONSTANTS[203];
ALGEBRAIC[22] = ( STATES[0]*CONSTANTS[6]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]);
ALGEBRAIC[31] = ( STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]);
ALGEBRAIC[120] = ( 1.00000*ALGEBRAIC[22]*( 0.750000*STATES[6]*exp( 1.00000*ALGEBRAIC[31]) - 0.750000*CONSTANTS[3]))/(exp( 1.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[133] = CONSTANTS[211]*ALGEBRAIC[120]*STATES[38];
ALGEBRAIC[135] = CONSTANTS[211]*ALGEBRAIC[120]*ALGEBRAIC[121];
ALGEBRAIC[141] = ALGEBRAIC[133]+ALGEBRAIC[135];
ALGEBRAIC[134] = CONSTANTS[213]*ALGEBRAIC[120]*STATES[39];
ALGEBRAIC[136] = CONSTANTS[213]*ALGEBRAIC[120]*ALGEBRAIC[122];
ALGEBRAIC[142] = ALGEBRAIC[134]+ALGEBRAIC[136];
ALGEBRAIC[63] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[146] = ( ALGEBRAIC[142]*ALGEBRAIC[63]+ ALGEBRAIC[141]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
RATES[6] = ( - ALGEBRAIC[146]*CONSTANTS[35]*CONSTANTS[202])/( CONSTANTS[6]*CONSTANTS[206]) - ALGEBRAIC[236];
ALGEBRAIC[48] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log(CONSTANTS[1]/STATES[3]);
ALGEBRAIC[51] = CONSTANTS[50]*STATES[10]+ CONSTANTS[175]*STATES[11];
ALGEBRAIC[52] = CONSTANTS[50]*STATES[10]+ CONSTANTS[175]*STATES[13];
ALGEBRAIC[53] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[54] = CONSTANTS[51]*CONSTANTS[39]*(STATES[0] - ALGEBRAIC[48])*pow(STATES[9], 3.00000)*( (1.00000 - ALGEBRAIC[53])*ALGEBRAIC[51]*STATES[12]+ ALGEBRAIC[53]*ALGEBRAIC[52]*STATES[14]);
ALGEBRAIC[55] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[56] = CONSTANTS[177]*(STATES[0] - ALGEBRAIC[48])*STATES[15]*( (1.00000 - ALGEBRAIC[55])*STATES[16]+ ALGEBRAIC[55]*STATES[17]);
ALGEBRAIC[180] = 1.00000/(1.00000+pow(CONSTANTS[136]/STATES[8], 2.00000));
ALGEBRAIC[153] = exp(( CONSTANTS[134]*STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[160] = 1.00000+ (CONSTANTS[1]/CONSTANTS[127])*(1.00000+1.00000/ALGEBRAIC[153]);
ALGEBRAIC[161] = CONSTANTS[1]/( CONSTANTS[127]*ALGEBRAIC[153]*ALGEBRAIC[160]);
ALGEBRAIC[164] = ALGEBRAIC[161]*CONSTANTS[131];
ALGEBRAIC[154] = 1.00000+ (STATES[3]/CONSTANTS[127])*(1.00000+ALGEBRAIC[153]);
ALGEBRAIC[155] = ( STATES[3]*ALGEBRAIC[153])/( CONSTANTS[127]*ALGEBRAIC[154]);
ALGEBRAIC[167] = ALGEBRAIC[155]*CONSTANTS[131];
ALGEBRAIC[157] = 1.00000+ (STATES[3]/CONSTANTS[125])*(1.00000+STATES[3]/CONSTANTS[126]);
ALGEBRAIC[158] = ( STATES[3]*STATES[3])/( ALGEBRAIC[157]*CONSTANTS[125]*CONSTANTS[126]);
ALGEBRAIC[170] = ALGEBRAIC[158]*ALGEBRAIC[155]*CONSTANTS[129];
ALGEBRAIC[171] = ALGEBRAIC[161]*CONSTANTS[215]*CONSTANTS[129];
ALGEBRAIC[162] = 1.00000/ALGEBRAIC[160];
ALGEBRAIC[163] = ALGEBRAIC[162]*CONSTANTS[130];
ALGEBRAIC[165] = ALGEBRAIC[163]+ALGEBRAIC[164];
ALGEBRAIC[152] = exp(( CONSTANTS[135]*STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[156] = 1.00000/ALGEBRAIC[154];
ALGEBRAIC[166] = ( ALGEBRAIC[156]*CONSTANTS[130])/ALGEBRAIC[152];
ALGEBRAIC[168] = ALGEBRAIC[166]+ALGEBRAIC[167];
ALGEBRAIC[159] = 1.00000/ALGEBRAIC[157];
ALGEBRAIC[169] = ALGEBRAIC[159]*STATES[8]*CONSTANTS[132];
ALGEBRAIC[172] = CONSTANTS[218]*ALGEBRAIC[168]*(ALGEBRAIC[170]+ALGEBRAIC[169])+ CONSTANTS[219]*ALGEBRAIC[170]*(CONSTANTS[218]+ALGEBRAIC[165]);
ALGEBRAIC[173] = CONSTANTS[217]*ALGEBRAIC[170]*(ALGEBRAIC[168]+CONSTANTS[219])+ ALGEBRAIC[168]*ALGEBRAIC[169]*(CONSTANTS[217]+ALGEBRAIC[171]);
ALGEBRAIC[174] = CONSTANTS[217]*ALGEBRAIC[165]*(ALGEBRAIC[170]+ALGEBRAIC[169])+ ALGEBRAIC[171]*ALGEBRAIC[169]*(CONSTANTS[218]+ALGEBRAIC[165]);
ALGEBRAIC[175] = CONSTANTS[218]*ALGEBRAIC[171]*(ALGEBRAIC[168]+CONSTANTS[219])+ ALGEBRAIC[165]*CONSTANTS[219]*(CONSTANTS[217]+ALGEBRAIC[171]);
ALGEBRAIC[176] = ALGEBRAIC[172]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[177] = ALGEBRAIC[173]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[178] = ALGEBRAIC[174]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[179] = ALGEBRAIC[175]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[181] = ( 3.00000*( ALGEBRAIC[179]*ALGEBRAIC[170] - ALGEBRAIC[176]*ALGEBRAIC[171])+ ALGEBRAIC[178]*ALGEBRAIC[167]) - ALGEBRAIC[177]*ALGEBRAIC[164];
ALGEBRAIC[182] = ALGEBRAIC[177]*CONSTANTS[218] - ALGEBRAIC[176]*CONSTANTS[217];
ALGEBRAIC[183] = 0.800000*CONSTANTS[220]*ALGEBRAIC[180]*( CONSTANTS[7]*ALGEBRAIC[181]+ CONSTANTS[8]*ALGEBRAIC[182]);
ALGEBRAIC[235] = ( CONSTANTS[163]*ALGEBRAIC[22]*( STATES[3]*exp(ALGEBRAIC[31]) - CONSTANTS[1]))/(exp(ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[238] = (STATES[4] - STATES[3])/2.00000;
RATES[3] = ( - (ALGEBRAIC[54]+ALGEBRAIC[56]+ 3.00000*ALGEBRAIC[183]+ 3.00000*ALGEBRAIC[232]+ALGEBRAIC[235])*CONSTANTS[202]*CONSTANTS[35])/( CONSTANTS[6]*CONSTANTS[203])+( ALGEBRAIC[238]*CONSTANTS[206])/CONSTANTS[203];
ALGEBRAIC[119] = ( 1.00000*ALGEBRAIC[22]*( 0.750000*STATES[4]*exp( 1.00000*ALGEBRAIC[31]) - 0.750000*CONSTANTS[1]))/(exp( 1.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[129] = CONSTANTS[210]*ALGEBRAIC[119]*STATES[38];
ALGEBRAIC[131] = CONSTANTS[210]*ALGEBRAIC[119]*ALGEBRAIC[121];
ALGEBRAIC[139] = ALGEBRAIC[129]+ALGEBRAIC[131];
ALGEBRAIC[130] = CONSTANTS[212]*ALGEBRAIC[119]*STATES[39];
ALGEBRAIC[132] = CONSTANTS[212]*ALGEBRAIC[119]*ALGEBRAIC[122];
ALGEBRAIC[140] = ALGEBRAIC[130]+ALGEBRAIC[132];
ALGEBRAIC[145] = ( ALGEBRAIC[140]*ALGEBRAIC[63]+ ALGEBRAIC[139]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
ALGEBRAIC[210] = 1.00000/(1.00000+pow(CONSTANTS[136]/STATES[2], 2.00000));
ALGEBRAIC[190] = 1.00000+ (CONSTANTS[1]/CONSTANTS[127])*(1.00000+1.00000/ALGEBRAIC[153]);
ALGEBRAIC[191] = CONSTANTS[1]/( CONSTANTS[127]*ALGEBRAIC[153]*ALGEBRAIC[190]);
ALGEBRAIC[194] = ALGEBRAIC[191]*CONSTANTS[131];
ALGEBRAIC[184] = 1.00000+ (STATES[4]/CONSTANTS[127])*(1.00000+ALGEBRAIC[153]);
ALGEBRAIC[185] = ( STATES[4]*ALGEBRAIC[153])/( CONSTANTS[127]*ALGEBRAIC[184]);
ALGEBRAIC[197] = ALGEBRAIC[185]*CONSTANTS[131];
ALGEBRAIC[187] = 1.00000+ (STATES[4]/CONSTANTS[125])*(1.00000+STATES[4]/CONSTANTS[126]);
ALGEBRAIC[188] = ( STATES[4]*STATES[4])/( ALGEBRAIC[187]*CONSTANTS[125]*CONSTANTS[126]);
ALGEBRAIC[200] = ALGEBRAIC[188]*ALGEBRAIC[185]*CONSTANTS[129];
ALGEBRAIC[201] = ALGEBRAIC[191]*CONSTANTS[222]*CONSTANTS[129];
ALGEBRAIC[192] = 1.00000/ALGEBRAIC[190];
ALGEBRAIC[193] = ALGEBRAIC[192]*CONSTANTS[130];
ALGEBRAIC[195] = ALGEBRAIC[193]+ALGEBRAIC[194];
ALGEBRAIC[186] = 1.00000/ALGEBRAIC[184];
ALGEBRAIC[196] = ( ALGEBRAIC[186]*CONSTANTS[130])/ALGEBRAIC[152];
ALGEBRAIC[198] = ALGEBRAIC[196]+ALGEBRAIC[197];
ALGEBRAIC[189] = 1.00000/ALGEBRAIC[187];
ALGEBRAIC[199] = ALGEBRAIC[189]*STATES[2]*CONSTANTS[132];
ALGEBRAIC[202] = CONSTANTS[225]*ALGEBRAIC[198]*(ALGEBRAIC[200]+ALGEBRAIC[199])+ CONSTANTS[226]*ALGEBRAIC[200]*(CONSTANTS[225]+ALGEBRAIC[195]);
ALGEBRAIC[203] = CONSTANTS[224]*ALGEBRAIC[200]*(ALGEBRAIC[198]+CONSTANTS[226])+ ALGEBRAIC[198]*ALGEBRAIC[199]*(CONSTANTS[224]+ALGEBRAIC[201]);
ALGEBRAIC[204] = CONSTANTS[224]*ALGEBRAIC[195]*(ALGEBRAIC[200]+ALGEBRAIC[199])+ ALGEBRAIC[201]*ALGEBRAIC[199]*(CONSTANTS[225]+ALGEBRAIC[195]);
ALGEBRAIC[205] = CONSTANTS[225]*ALGEBRAIC[201]*(ALGEBRAIC[198]+CONSTANTS[226])+ ALGEBRAIC[195]*CONSTANTS[226]*(CONSTANTS[224]+ALGEBRAIC[201]);
ALGEBRAIC[206] = ALGEBRAIC[202]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[207] = ALGEBRAIC[203]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[208] = ALGEBRAIC[204]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[209] = ALGEBRAIC[205]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[211] = ( 3.00000*( ALGEBRAIC[209]*ALGEBRAIC[200] - ALGEBRAIC[206]*ALGEBRAIC[201])+ ALGEBRAIC[208]*ALGEBRAIC[197]) - ALGEBRAIC[207]*ALGEBRAIC[194];
ALGEBRAIC[212] = ALGEBRAIC[207]*CONSTANTS[225] - ALGEBRAIC[206]*CONSTANTS[224];
ALGEBRAIC[213] = 0.200000*CONSTANTS[220]*ALGEBRAIC[210]*( CONSTANTS[7]*ALGEBRAIC[211]+ CONSTANTS[8]*ALGEBRAIC[212]);
RATES[4] = ( - (ALGEBRAIC[145]+ 3.00000*ALGEBRAIC[213])*CONSTANTS[35]*CONSTANTS[202])/( CONSTANTS[6]*CONSTANTS[206]) - ALGEBRAIC[238];
ALGEBRAIC[118] = ( 4.00000*ALGEBRAIC[22]*( 1.20000*STATES[2]*exp( 2.00000*ALGEBRAIC[31]) - 0.341000*CONSTANTS[2]))/(exp( 2.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[123] = CONSTANTS[208]*ALGEBRAIC[118]*STATES[38];
ALGEBRAIC[126] = CONSTANTS[208]*ALGEBRAIC[118]*ALGEBRAIC[121];
ALGEBRAIC[137] = ALGEBRAIC[123]+ALGEBRAIC[126];
ALGEBRAIC[124] = CONSTANTS[209]*ALGEBRAIC[118]*STATES[39];
ALGEBRAIC[127] = CONSTANTS[209]*ALGEBRAIC[118]*ALGEBRAIC[122];
ALGEBRAIC[138] = ALGEBRAIC[124]+ALGEBRAIC[127];
ALGEBRAIC[143] = ( ALGEBRAIC[138]*ALGEBRAIC[63]+ ALGEBRAIC[137]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
ALGEBRAIC[239] = ( CONSTANTS[166]*STATES[8])/(CONSTANTS[167]+STATES[8]);
ALGEBRAIC[237] = ( (1.00000 - CONSTANTS[165])*CONSTANTS[164]*16.0000*ALGEBRAIC[22]*( 1.20000*STATES[8]*exp( 2.00000*ALGEBRAIC[31]) - 0.341000*CONSTANTS[2]))/(exp( 2.00000*ALGEBRAIC[31]) - 1.00000);
RATES[0] = - (ALGEBRAIC[54]+ALGEBRAIC[56]+ALGEBRAIC[62]+ALGEBRAIC[143]+ALGEBRAIC[145]+ALGEBRAIC[146]+ALGEBRAIC[147]+ALGEBRAIC[149]+ALGEBRAIC[151]+ALGEBRAIC[183]+ALGEBRAIC[213]+ALGEBRAIC[232]+ALGEBRAIC[235]+ALGEBRAIC[234]+ALGEBRAIC[239]+ALGEBRAIC[237]+ALGEBRAIC[8]);
ALGEBRAIC[240] = ( (STATES[2] - STATES[8])*1.70000)/0.200000;
ALGEBRAIC[242] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[241] = 1.00000 - 1.00000/(1.00000+exp((STATES[7] - 0.300000)/0.100000));
ALGEBRAIC[243] = (CONSTANTS[0]==2.00000 ? CONSTANTS[191]*ALGEBRAIC[241]*STATES[54]*STATES[55]*(STATES[7] - STATES[2]) : CONSTANTS[170]*ALGEBRAIC[241]*STATES[54]*STATES[55]*(STATES[7] - STATES[2]));
ALGEBRAIC[244] = (CONSTANTS[0]==2.00000 ? CONSTANTS[192]*1.70000*ALGEBRAIC[241]*STATES[54]*STATES[56]*(STATES[7] - STATES[2]) : CONSTANTS[192]*ALGEBRAIC[241]*STATES[54]*STATES[56]*(STATES[7] - STATES[2]));
ALGEBRAIC[245] = (1.00000 - ALGEBRAIC[242])*ALGEBRAIC[243]+ ALGEBRAIC[242]*ALGEBRAIC[244];
ALGEBRAIC[43] = 1.00000/(1.00000+( CONSTANTS[27]*CONSTANTS[28])/pow(CONSTANTS[28]+STATES[2], 2.00000)+( CONSTANTS[29]*CONSTANTS[30])/pow(CONSTANTS[30]+STATES[2], 2.00000));
RATES[2] = ALGEBRAIC[43]*((( - (ALGEBRAIC[143] - 2.00000*ALGEBRAIC[213])*CONSTANTS[202])/( 2.00000*CONSTANTS[6]*CONSTANTS[206])+( ALGEBRAIC[245]*CONSTANTS[207])/CONSTANTS[206]) - ALGEBRAIC[240]);
ALGEBRAIC[246] = ( CONSTANTS[193]*0.00437500*STATES[8])/(STATES[8]+0.000920000);
ALGEBRAIC[247] = ( CONSTANTS[193]*2.75000*0.00437500*STATES[8])/((STATES[8]+0.000920000) - 0.000170000);
ALGEBRAIC[248] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[250] = CONSTANTS[172]*( (1.00000 - ALGEBRAIC[248])*ALGEBRAIC[246]+ ALGEBRAIC[248]*ALGEBRAIC[247]);
ALGEBRAIC[249] = ( 0.0123000*STATES[7])/15.0000;
ALGEBRAIC[41] = 1.00000/(1.00000+( CONSTANTS[173]*CONSTANTS[24])/pow(CONSTANTS[24]+STATES[8], 2.00000)+( CONSTANTS[25]*CONSTANTS[26])/pow(CONSTANTS[26]+STATES[8], 2.00000));
RATES[8] = ALGEBRAIC[41]*((( - ((ALGEBRAIC[239]+ALGEBRAIC[237]) - 2.00000*ALGEBRAIC[183])*CONSTANTS[202])/( 2.00000*CONSTANTS[6]*CONSTANTS[203]) - ( ALGEBRAIC[250]*CONSTANTS[207])/CONSTANTS[203])+( ALGEBRAIC[249]*CONSTANTS[207])/CONSTANTS[203]+( ALGEBRAIC[240]*CONSTANTS[206])/CONSTANTS[203]);
ALGEBRAIC[45] = 1.00000/(1.00000+( CONSTANTS[31]*CONSTANTS[32])/pow(CONSTANTS[32]+STATES[7], 2.00000));
RATES[7] = ALGEBRAIC[45]*((ALGEBRAIC[250] - ALGEBRAIC[249]) - ALGEBRAIC[245]);
}
void
computeVariables(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
ALGEBRAIC[2] = 1.00000/(1.00000+exp((STATES[0]+87.6100)/7.48800));
ALGEBRAIC[3] = 1.00000/(1.00000+exp((STATES[0]+93.8100)/7.48800));
ALGEBRAIC[6] = 1.00000/(1.00000+exp((STATES[0]+19.5800+25.0000)/3.69600));
ALGEBRAIC[11] = CONSTANTS[168] - CONSTANTS[169]/(1.00000+exp(( 1000.00*STATES[2] - 0.0430000)/0.00820000));
ALGEBRAIC[12] = 1.00000 - 1.00000/(1.00000+exp(( 1000.00*STATES[2] - (STATES[53]+CONSTANTS[186]))/0.00300000));
ALGEBRAIC[13] = 1.00000/(1.00000+exp(( 1000.00*STATES[2] - (STATES[53]+CONSTANTS[187]))/0.00100000));
ALGEBRAIC[0] = 1.00000/(1.00000+exp(- (STATES[0]+CONSTANTS[40])/CONSTANTS[41]));
ALGEBRAIC[15] = 1.00000/( CONSTANTS[44]*exp((STATES[0]+CONSTANTS[42])/CONSTANTS[43])+ CONSTANTS[45]*exp(- (STATES[0]+CONSTANTS[46])/CONSTANTS[47]));
ALGEBRAIC[1] = 1.00000/(1.00000+exp((STATES[0]+CONSTANTS[48])/CONSTANTS[49]));
ALGEBRAIC[16] = 1.00000/( 3.68600e-06*exp(- (STATES[0]+3.88750)/7.85790)+ 16.0000*exp((STATES[0] - 0.496300)/9.18430))+0.0750000;
ALGEBRAIC[17] = 1.00000/( 0.00979400*exp(- (STATES[0]+17.9500)/28.0500)+ 0.334300*exp((STATES[0]+5.73000)/56.6600));
ALGEBRAIC[4] = 1.00000/(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 14.3400)/14.8200));
ALGEBRAIC[19] = 1.05150/(1.00000/( 1.20890*(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 18.4099)/29.3814)))+3.50000/(1.00000+exp((STATES[0]+CONSTANTS[57]+100.000)/29.3814)));
ALGEBRAIC[7] = STATES[25]*150.000;
ALGEBRAIC[21] = (1.00000 - STATES[24])/pow(1.00000+CONSTANTS[60]/STATES[2], 4.00000);
ALGEBRAIC[9] = 1.00000/(1.00000+exp(- (STATES[0]+11.6000+CONSTANTS[119])/8.93200));
ALGEBRAIC[24] = 817.300+1.00000/( 0.000232600*exp((STATES[0]+48.2800+CONSTANTS[119])/17.8000)+ 0.00129200*exp(- (STATES[0]+210.000+CONSTANTS[119])/230.000));
ALGEBRAIC[10] = 1.00000/(1.00000+exp(- (STATES[0]+ 2.55380*CONSTANTS[3]+144.590+CONSTANTS[123])/( 1.56920*CONSTANTS[3]+3.81150)));
ALGEBRAIC[25] = 122.200/(exp(- (STATES[0]+CONSTANTS[123]+127.200)/20.3600)+exp((STATES[0]+CONSTANTS[123]+236.800)/69.3300));
ALGEBRAIC[18] = ALGEBRAIC[1];
ALGEBRAIC[26] = (4.85900+1.00000/( 0.862800*exp(- (STATES[0]+116.726)/7.60050)+ 1.10960*exp((STATES[0]+6.27190)/9.03580)))*CONSTANTS[38];
ALGEBRAIC[30] = 1.00000/(1.00000+exp(- ((STATES[0]+CONSTANTS[57]) - 24.3400)/14.8200));
ALGEBRAIC[23] = ALGEBRAIC[9];
ALGEBRAIC[32] = 1.00000/( 0.0100000*exp(((STATES[0] - 50.0000)+CONSTANTS[119])/20.0000)+ 0.0193000*exp(- (STATES[0]+66.5400+CONSTANTS[119])/31.0000));
ALGEBRAIC[37] = ( CONSTANTS[21]*(1.00000 - STATES[1]))/(1.00000+CONSTANTS[22]/STATES[2]);
ALGEBRAIC[27] = 1.00000/(1.00000+exp((STATES[0]+84.7000)/6.22000));
ALGEBRAIC[33] = 3.00000*ALGEBRAIC[17];
ALGEBRAIC[34] = 1.46000*ALGEBRAIC[26];
ALGEBRAIC[28] = 1.00000/(1.00000+exp(- (STATES[0]+42.8500)/5.26400));
ALGEBRAIC[35] = ALGEBRAIC[15];
ALGEBRAIC[5] = 1.00000/(1.00000+exp((STATES[0]+CONSTANTS[57]+43.9400)/5.71100));
ALGEBRAIC[20] = (CONSTANTS[0]==1.00000 ? 1.00000 - 0.950000/(1.00000+exp((STATES[0]+CONSTANTS[57]+70.0000)/5.00000)) : 1.00000);
ALGEBRAIC[29] = 4.56200+1.00000/( 0.393300*exp(- (STATES[0]+CONSTANTS[57]+100.000)/100.000)+ 0.0800400*exp((STATES[0]+CONSTANTS[57]+50.0000)/16.5900));
ALGEBRAIC[38] = ALGEBRAIC[29]*ALGEBRAIC[20];
ALGEBRAIC[36] = 23.6200+1.00000/( 0.00141600*exp(- (STATES[0]+CONSTANTS[57]+96.5200)/59.0500)+ 1.78000e-08*exp((STATES[0]+CONSTANTS[57]+114.100)/8.07900));
ALGEBRAIC[40] = ALGEBRAIC[36]*ALGEBRAIC[20];
ALGEBRAIC[42] = 1.35400+0.000100000/(exp(((STATES[0]+CONSTANTS[57]) - 167.400)/15.8900)+exp(- ((STATES[0]+CONSTANTS[57]) - 12.2300)/0.215400));
ALGEBRAIC[44] = 1.00000 - 0.500000/(1.00000+exp((STATES[0]+CONSTANTS[57]+70.0000)/20.0000));
ALGEBRAIC[46] = ALGEBRAIC[42]*ALGEBRAIC[44]*ALGEBRAIC[38];
ALGEBRAIC[47] = ALGEBRAIC[42]*ALGEBRAIC[44]*ALGEBRAIC[40];
ALGEBRAIC[64] = (( CONSTANTS[179]*STATES[24])/(1.00000 - STATES[24]))*(1.00000 - CONSTANTS[58]);
ALGEBRAIC[65] = 1.00000/(1.00000+exp(- (STATES[0]+3.94000)/4.23000));
ALGEBRAIC[66] = 0.600000+1.00000/(exp( - 0.0500000*(STATES[0]+6.00000))+exp( 0.0900000*(STATES[0]+14.0000)));
ALGEBRAIC[67] = ALGEBRAIC[65]/ALGEBRAIC[66];
ALGEBRAIC[68] = (1.00000 - ALGEBRAIC[65])/ALGEBRAIC[66];
ALGEBRAIC[69] = 1.00000/(1.00000+exp((STATES[0]+19.5800)/3.69600));
ALGEBRAIC[70] = ALGEBRAIC[69];
ALGEBRAIC[74] = 35.0000+ 350.000*exp(- pow(STATES[0]+20.0000, 2.00000)/( 2.00000*100.000));
ALGEBRAIC[75] = ALGEBRAIC[74];
ALGEBRAIC[79] = ALGEBRAIC[70]/ALGEBRAIC[75];
ALGEBRAIC[83] = (1.00000 - ALGEBRAIC[70])/ALGEBRAIC[75];
ALGEBRAIC[72] = ALGEBRAIC[69];
ALGEBRAIC[77] = ALGEBRAIC[74];
ALGEBRAIC[80] = ALGEBRAIC[72]/ALGEBRAIC[77];
ALGEBRAIC[84] = (1.00000 - ALGEBRAIC[72])/ALGEBRAIC[77];
ALGEBRAIC[87] = 0.800000/(1.00000+exp((STATES[0]+19.5800)/3.69600))+0.200000;
ALGEBRAIC[88] = 1.00000*(70.0000+1.20000/( 0.00450000*exp((STATES[0]+20.0000)/- 50.0000)+ 0.00450000*exp((STATES[0]+30.0000)/10.0000)));
ALGEBRAIC[89] = (1.00000 - ALGEBRAIC[87])/ALGEBRAIC[88];
ALGEBRAIC[90] = ALGEBRAIC[87]/ALGEBRAIC[88];
ALGEBRAIC[101] = 1.00000*(100.000+0.00000/( 0.00350000*exp((STATES[0]+5.00000)/- 84.0000)+ 0.00350000*exp((STATES[0]+5.00000)/4.00000)));
ALGEBRAIC[103] = ALGEBRAIC[101];
ALGEBRAIC[104] = (( ALGEBRAIC[67]*ALGEBRAIC[89]*ALGEBRAIC[79])/ALGEBRAIC[103])/( ALGEBRAIC[67]*ALGEBRAIC[89]*ALGEBRAIC[79]+ ALGEBRAIC[68]*ALGEBRAIC[90]*ALGEBRAIC[83]);
ALGEBRAIC[107] = 1.00000/ALGEBRAIC[103] - ALGEBRAIC[104];
ALGEBRAIC[93] = ALGEBRAIC[89]/CONSTANTS[180];
ALGEBRAIC[94] = ALGEBRAIC[90]/CONSTANTS[180];
ALGEBRAIC[102] = ALGEBRAIC[101]*CONSTANTS[180];
ALGEBRAIC[105] = (( ALGEBRAIC[67]*ALGEBRAIC[93]*ALGEBRAIC[80])/ALGEBRAIC[102])/( ALGEBRAIC[67]*ALGEBRAIC[93]*ALGEBRAIC[80]+ ALGEBRAIC[68]*ALGEBRAIC[94]*ALGEBRAIC[84]);
ALGEBRAIC[108] = 1.00000/ALGEBRAIC[102] - ALGEBRAIC[105];
ALGEBRAIC[71] = ALGEBRAIC[69];
ALGEBRAIC[76] = ALGEBRAIC[74];
ALGEBRAIC[81] = ALGEBRAIC[71]/ALGEBRAIC[76];
ALGEBRAIC[85] = (1.00000 - ALGEBRAIC[71])/ALGEBRAIC[76];
ALGEBRAIC[95] = ALGEBRAIC[89]*CONSTANTS[63];
ALGEBRAIC[96] = ALGEBRAIC[90]*CONSTANTS[63];
ALGEBRAIC[106] = ALGEBRAIC[103]/CONSTANTS[63];
ALGEBRAIC[112] = (( ALGEBRAIC[67]*ALGEBRAIC[95]*ALGEBRAIC[81])/ALGEBRAIC[106])/( ALGEBRAIC[67]*ALGEBRAIC[95]*ALGEBRAIC[81]+ ALGEBRAIC[68]*ALGEBRAIC[96]*ALGEBRAIC[85]);
ALGEBRAIC[114] = 1.00000/ALGEBRAIC[106] - ALGEBRAIC[112];
ALGEBRAIC[73] = ALGEBRAIC[69];
ALGEBRAIC[78] = ALGEBRAIC[74];
ALGEBRAIC[82] = ALGEBRAIC[73]/ALGEBRAIC[78];
ALGEBRAIC[86] = (1.00000 - ALGEBRAIC[73])/ALGEBRAIC[78];
ALGEBRAIC[99] = ALGEBRAIC[93]*CONSTANTS[63];
ALGEBRAIC[100] = ALGEBRAIC[94]*CONSTANTS[63];
ALGEBRAIC[109] = (ALGEBRAIC[103]/CONSTANTS[63])*CONSTANTS[180];
ALGEBRAIC[113] = (( ALGEBRAIC[67]*ALGEBRAIC[99]*ALGEBRAIC[82])/ALGEBRAIC[109])/( ALGEBRAIC[67]*ALGEBRAIC[99]*ALGEBRAIC[82]+ ALGEBRAIC[68]*ALGEBRAIC[100]*ALGEBRAIC[86]);
ALGEBRAIC[115] = 1.00000/ALGEBRAIC[109] - ALGEBRAIC[113];
ALGEBRAIC[121] = ((((((1.00000 - STATES[34]) - STATES[32]) - STATES[33]) - STATES[28]) - STATES[26]) - STATES[27]) - STATES[38];
ALGEBRAIC[122] = ((((((1.00000 - STATES[37]) - STATES[35]) - STATES[36]) - STATES[31]) - STATES[29]) - STATES[30]) - STATES[39];
ALGEBRAIC[49] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log(CONSTANTS[3]/STATES[5]);
ALGEBRAIC[57] = 1.00000/(1.00000+exp(((STATES[0]+CONSTANTS[57]) - 213.600)/151.200));
ALGEBRAIC[58] = 1.00000 - ALGEBRAIC[57];
ALGEBRAIC[59] = ALGEBRAIC[57]*STATES[19]+ ALGEBRAIC[58]*STATES[20];
ALGEBRAIC[60] = ALGEBRAIC[57]*STATES[22]+ ALGEBRAIC[58]*STATES[23];
ALGEBRAIC[39] = ALGEBRAIC[37]+STATES[1];
ALGEBRAIC[61] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[62] = CONSTANTS[178]*(STATES[0] - ALGEBRAIC[49])*( (1.00000 - ALGEBRAIC[61])*STATES[18]*ALGEBRAIC[59]+ ALGEBRAIC[61]*STATES[21]*ALGEBRAIC[60]);
ALGEBRAIC[147] = CONSTANTS[199]*STATES[44]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[50] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log((CONSTANTS[3]+ CONSTANTS[36]*CONSTANTS[1])/(STATES[5]+ CONSTANTS[36]*STATES[3]));
ALGEBRAIC[148] = 1.00000+0.600000/(1.00000+pow(3.80000e-05/STATES[8], 1.40000));
ALGEBRAIC[149] = CONSTANTS[182]*ALGEBRAIC[148]*STATES[50]*STATES[51]*(STATES[0] - ALGEBRAIC[50]);
ALGEBRAIC[150] = 1.00000/(1.00000+exp((((STATES[0]+105.800) - 2.60000*CONSTANTS[3])+CONSTANTS[123])/( CONSTANTS[124]*9.49300)));
ALGEBRAIC[151] = CONSTANTS[183]* pow(CONSTANTS[3], 1.0 / 2)*ALGEBRAIC[150]*STATES[52]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[215] = CONSTANTS[148]*exp(( (1.00000 - CONSTANTS[149])*STATES[0]*CONSTANTS[6])/( 3.00000*CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[219] = ( CONSTANTS[143]*pow(CONSTANTS[3]/CONSTANTS[151], 2.00000))/((pow(1.00000+CONSTANTS[1]/ALGEBRAIC[215], 3.00000)+pow(1.00000+CONSTANTS[3]/CONSTANTS[151], 2.00000)) - 1.00000);
ALGEBRAIC[216] = CONSTANTS[156]/(1.00000+CONSTANTS[155]/CONSTANTS[157]+STATES[3]/CONSTANTS[158]+STATES[5]/CONSTANTS[159]);
ALGEBRAIC[220] = ( CONSTANTS[144]*ALGEBRAIC[216]*CONSTANTS[155])/(1.00000+CONSTANTS[153]/CONSTANTS[154]);
ALGEBRAIC[214] = CONSTANTS[147]*exp(( CONSTANTS[149]*STATES[0]*CONSTANTS[6])/( 3.00000*CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[217] = ( CONSTANTS[139]*pow(STATES[3]/ALGEBRAIC[214], 3.00000))/((pow(1.00000+STATES[3]/ALGEBRAIC[214], 3.00000)+pow(1.00000+STATES[5]/CONSTANTS[150], 2.00000)) - 1.00000);
ALGEBRAIC[218] = ( CONSTANTS[142]*pow(CONSTANTS[1]/ALGEBRAIC[215], 3.00000))/((pow(1.00000+CONSTANTS[1]/ALGEBRAIC[215], 3.00000)+pow(1.00000+CONSTANTS[3]/CONSTANTS[151], 2.00000)) - 1.00000);
ALGEBRAIC[221] = ( CONSTANTS[146]*pow(STATES[5]/CONSTANTS[150], 2.00000))/((pow(1.00000+STATES[3]/ALGEBRAIC[214], 3.00000)+pow(1.00000+STATES[5]/CONSTANTS[150], 2.00000)) - 1.00000);
ALGEBRAIC[222] = CONSTANTS[229]*ALGEBRAIC[217]*CONSTANTS[228]+ ALGEBRAIC[218]*ALGEBRAIC[221]*ALGEBRAIC[220]+ CONSTANTS[228]*ALGEBRAIC[221]*ALGEBRAIC[220]+ ALGEBRAIC[220]*ALGEBRAIC[217]*CONSTANTS[228];
ALGEBRAIC[223] = ALGEBRAIC[218]*CONSTANTS[227]*ALGEBRAIC[221]+ ALGEBRAIC[217]*CONSTANTS[228]*ALGEBRAIC[219]+ ALGEBRAIC[219]*CONSTANTS[227]*ALGEBRAIC[221]+ CONSTANTS[228]*ALGEBRAIC[219]*ALGEBRAIC[221];
ALGEBRAIC[224] = CONSTANTS[228]*ALGEBRAIC[219]*CONSTANTS[229]+ ALGEBRAIC[220]*ALGEBRAIC[218]*CONSTANTS[227]+ ALGEBRAIC[218]*CONSTANTS[227]*CONSTANTS[229]+ ALGEBRAIC[219]*CONSTANTS[229]*CONSTANTS[227];
ALGEBRAIC[225] = ALGEBRAIC[221]*ALGEBRAIC[220]*ALGEBRAIC[218]+ ALGEBRAIC[219]*CONSTANTS[229]*ALGEBRAIC[217]+ ALGEBRAIC[218]*CONSTANTS[229]*ALGEBRAIC[217]+ ALGEBRAIC[220]*ALGEBRAIC[218]*ALGEBRAIC[217];
ALGEBRAIC[226] = ALGEBRAIC[222]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[227] = ALGEBRAIC[223]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[230] = 3.00000*( ALGEBRAIC[226]*ALGEBRAIC[219] - ALGEBRAIC[227]*ALGEBRAIC[220]);
ALGEBRAIC[228] = ALGEBRAIC[224]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[229] = ALGEBRAIC[225]/(ALGEBRAIC[222]+ALGEBRAIC[223]+ALGEBRAIC[224]+ALGEBRAIC[225]);
ALGEBRAIC[231] = 2.00000*( ALGEBRAIC[229]*CONSTANTS[227] - ALGEBRAIC[228]*ALGEBRAIC[217]);
ALGEBRAIC[232] = CONSTANTS[230]*( CONSTANTS[7]*ALGEBRAIC[230]+ CONSTANTS[9]*ALGEBRAIC[231]);
ALGEBRAIC[233] = 1.00000/(1.00000+exp(- (STATES[0] - 14.4800)/18.3400));
ALGEBRAIC[234] = CONSTANTS[185]*ALGEBRAIC[233]*(STATES[0] - ALGEBRAIC[49]);
ALGEBRAIC[8] = (VOI>=CONSTANTS[13]&&VOI<=CONSTANTS[14]&&(VOI - CONSTANTS[13]) - floor((VOI - CONSTANTS[13])/CONSTANTS[16])*CONSTANTS[16]<=CONSTANTS[17] ? CONSTANTS[15] : 0.00000);
ALGEBRAIC[236] = (STATES[6] - STATES[5])/2.00000;
ALGEBRAIC[22] = ( STATES[0]*CONSTANTS[6]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]);
ALGEBRAIC[31] = ( STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]);
ALGEBRAIC[120] = ( 1.00000*ALGEBRAIC[22]*( 0.750000*STATES[6]*exp( 1.00000*ALGEBRAIC[31]) - 0.750000*CONSTANTS[3]))/(exp( 1.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[133] = CONSTANTS[211]*ALGEBRAIC[120]*STATES[38];
ALGEBRAIC[135] = CONSTANTS[211]*ALGEBRAIC[120]*ALGEBRAIC[121];
ALGEBRAIC[141] = ALGEBRAIC[133]+ALGEBRAIC[135];
ALGEBRAIC[134] = CONSTANTS[213]*ALGEBRAIC[120]*STATES[39];
ALGEBRAIC[136] = CONSTANTS[213]*ALGEBRAIC[120]*ALGEBRAIC[122];
ALGEBRAIC[142] = ALGEBRAIC[134]+ALGEBRAIC[136];
ALGEBRAIC[63] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[146] = ( ALGEBRAIC[142]*ALGEBRAIC[63]+ ALGEBRAIC[141]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
ALGEBRAIC[48] = (( CONSTANTS[4]*CONSTANTS[5])/CONSTANTS[6])*log(CONSTANTS[1]/STATES[3]);
ALGEBRAIC[51] = CONSTANTS[50]*STATES[10]+ CONSTANTS[175]*STATES[11];
ALGEBRAIC[52] = CONSTANTS[50]*STATES[10]+ CONSTANTS[175]*STATES[13];
ALGEBRAIC[53] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[54] = CONSTANTS[51]*CONSTANTS[39]*(STATES[0] - ALGEBRAIC[48])*pow(STATES[9], 3.00000)*( (1.00000 - ALGEBRAIC[53])*ALGEBRAIC[51]*STATES[12]+ ALGEBRAIC[53]*ALGEBRAIC[52]*STATES[14]);
ALGEBRAIC[55] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[56] = CONSTANTS[177]*(STATES[0] - ALGEBRAIC[48])*STATES[15]*( (1.00000 - ALGEBRAIC[55])*STATES[16]+ ALGEBRAIC[55]*STATES[17]);
ALGEBRAIC[180] = 1.00000/(1.00000+pow(CONSTANTS[136]/STATES[8], 2.00000));
ALGEBRAIC[153] = exp(( CONSTANTS[134]*STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[160] = 1.00000+ (CONSTANTS[1]/CONSTANTS[127])*(1.00000+1.00000/ALGEBRAIC[153]);
ALGEBRAIC[161] = CONSTANTS[1]/( CONSTANTS[127]*ALGEBRAIC[153]*ALGEBRAIC[160]);
ALGEBRAIC[164] = ALGEBRAIC[161]*CONSTANTS[131];
ALGEBRAIC[154] = 1.00000+ (STATES[3]/CONSTANTS[127])*(1.00000+ALGEBRAIC[153]);
ALGEBRAIC[155] = ( STATES[3]*ALGEBRAIC[153])/( CONSTANTS[127]*ALGEBRAIC[154]);
ALGEBRAIC[167] = ALGEBRAIC[155]*CONSTANTS[131];
ALGEBRAIC[157] = 1.00000+ (STATES[3]/CONSTANTS[125])*(1.00000+STATES[3]/CONSTANTS[126]);
ALGEBRAIC[158] = ( STATES[3]*STATES[3])/( ALGEBRAIC[157]*CONSTANTS[125]*CONSTANTS[126]);
ALGEBRAIC[170] = ALGEBRAIC[158]*ALGEBRAIC[155]*CONSTANTS[129];
ALGEBRAIC[171] = ALGEBRAIC[161]*CONSTANTS[215]*CONSTANTS[129];
ALGEBRAIC[162] = 1.00000/ALGEBRAIC[160];
ALGEBRAIC[163] = ALGEBRAIC[162]*CONSTANTS[130];
ALGEBRAIC[165] = ALGEBRAIC[163]+ALGEBRAIC[164];
ALGEBRAIC[152] = exp(( CONSTANTS[135]*STATES[0]*CONSTANTS[6])/( CONSTANTS[4]*CONSTANTS[5]));
ALGEBRAIC[156] = 1.00000/ALGEBRAIC[154];
ALGEBRAIC[166] = ( ALGEBRAIC[156]*CONSTANTS[130])/ALGEBRAIC[152];
ALGEBRAIC[168] = ALGEBRAIC[166]+ALGEBRAIC[167];
ALGEBRAIC[159] = 1.00000/ALGEBRAIC[157];
ALGEBRAIC[169] = ALGEBRAIC[159]*STATES[8]*CONSTANTS[132];
ALGEBRAIC[172] = CONSTANTS[218]*ALGEBRAIC[168]*(ALGEBRAIC[170]+ALGEBRAIC[169])+ CONSTANTS[219]*ALGEBRAIC[170]*(CONSTANTS[218]+ALGEBRAIC[165]);
ALGEBRAIC[173] = CONSTANTS[217]*ALGEBRAIC[170]*(ALGEBRAIC[168]+CONSTANTS[219])+ ALGEBRAIC[168]*ALGEBRAIC[169]*(CONSTANTS[217]+ALGEBRAIC[171]);
ALGEBRAIC[174] = CONSTANTS[217]*ALGEBRAIC[165]*(ALGEBRAIC[170]+ALGEBRAIC[169])+ ALGEBRAIC[171]*ALGEBRAIC[169]*(CONSTANTS[218]+ALGEBRAIC[165]);
ALGEBRAIC[175] = CONSTANTS[218]*ALGEBRAIC[171]*(ALGEBRAIC[168]+CONSTANTS[219])+ ALGEBRAIC[165]*CONSTANTS[219]*(CONSTANTS[217]+ALGEBRAIC[171]);
ALGEBRAIC[176] = ALGEBRAIC[172]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[177] = ALGEBRAIC[173]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[178] = ALGEBRAIC[174]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[179] = ALGEBRAIC[175]/(ALGEBRAIC[172]+ALGEBRAIC[173]+ALGEBRAIC[174]+ALGEBRAIC[175]);
ALGEBRAIC[181] = ( 3.00000*( ALGEBRAIC[179]*ALGEBRAIC[170] - ALGEBRAIC[176]*ALGEBRAIC[171])+ ALGEBRAIC[178]*ALGEBRAIC[167]) - ALGEBRAIC[177]*ALGEBRAIC[164];
ALGEBRAIC[182] = ALGEBRAIC[177]*CONSTANTS[218] - ALGEBRAIC[176]*CONSTANTS[217];
ALGEBRAIC[183] = 0.800000*CONSTANTS[220]*ALGEBRAIC[180]*( CONSTANTS[7]*ALGEBRAIC[181]+ CONSTANTS[8]*ALGEBRAIC[182]);
ALGEBRAIC[235] = ( CONSTANTS[163]*ALGEBRAIC[22]*( STATES[3]*exp(ALGEBRAIC[31]) - CONSTANTS[1]))/(exp(ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[238] = (STATES[4] - STATES[3])/2.00000;
ALGEBRAIC[119] = ( 1.00000*ALGEBRAIC[22]*( 0.750000*STATES[4]*exp( 1.00000*ALGEBRAIC[31]) - 0.750000*CONSTANTS[1]))/(exp( 1.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[129] = CONSTANTS[210]*ALGEBRAIC[119]*STATES[38];
ALGEBRAIC[131] = CONSTANTS[210]*ALGEBRAIC[119]*ALGEBRAIC[121];
ALGEBRAIC[139] = ALGEBRAIC[129]+ALGEBRAIC[131];
ALGEBRAIC[130] = CONSTANTS[212]*ALGEBRAIC[119]*STATES[39];
ALGEBRAIC[132] = CONSTANTS[212]*ALGEBRAIC[119]*ALGEBRAIC[122];
ALGEBRAIC[140] = ALGEBRAIC[130]+ALGEBRAIC[132];
ALGEBRAIC[145] = ( ALGEBRAIC[140]*ALGEBRAIC[63]+ ALGEBRAIC[139]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
ALGEBRAIC[210] = 1.00000/(1.00000+pow(CONSTANTS[136]/STATES[2], 2.00000));
ALGEBRAIC[190] = 1.00000+ (CONSTANTS[1]/CONSTANTS[127])*(1.00000+1.00000/ALGEBRAIC[153]);
ALGEBRAIC[191] = CONSTANTS[1]/( CONSTANTS[127]*ALGEBRAIC[153]*ALGEBRAIC[190]);
ALGEBRAIC[194] = ALGEBRAIC[191]*CONSTANTS[131];
ALGEBRAIC[184] = 1.00000+ (STATES[4]/CONSTANTS[127])*(1.00000+ALGEBRAIC[153]);
ALGEBRAIC[185] = ( STATES[4]*ALGEBRAIC[153])/( CONSTANTS[127]*ALGEBRAIC[184]);
ALGEBRAIC[197] = ALGEBRAIC[185]*CONSTANTS[131];
ALGEBRAIC[187] = 1.00000+ (STATES[4]/CONSTANTS[125])*(1.00000+STATES[4]/CONSTANTS[126]);
ALGEBRAIC[188] = ( STATES[4]*STATES[4])/( ALGEBRAIC[187]*CONSTANTS[125]*CONSTANTS[126]);
ALGEBRAIC[200] = ALGEBRAIC[188]*ALGEBRAIC[185]*CONSTANTS[129];
ALGEBRAIC[201] = ALGEBRAIC[191]*CONSTANTS[222]*CONSTANTS[129];
ALGEBRAIC[192] = 1.00000/ALGEBRAIC[190];
ALGEBRAIC[193] = ALGEBRAIC[192]*CONSTANTS[130];
ALGEBRAIC[195] = ALGEBRAIC[193]+ALGEBRAIC[194];
ALGEBRAIC[186] = 1.00000/ALGEBRAIC[184];
ALGEBRAIC[196] = ( ALGEBRAIC[186]*CONSTANTS[130])/ALGEBRAIC[152];
ALGEBRAIC[198] = ALGEBRAIC[196]+ALGEBRAIC[197];
ALGEBRAIC[189] = 1.00000/ALGEBRAIC[187];
ALGEBRAIC[199] = ALGEBRAIC[189]*STATES[2]*CONSTANTS[132];
ALGEBRAIC[202] = CONSTANTS[225]*ALGEBRAIC[198]*(ALGEBRAIC[200]+ALGEBRAIC[199])+ CONSTANTS[226]*ALGEBRAIC[200]*(CONSTANTS[225]+ALGEBRAIC[195]);
ALGEBRAIC[203] = CONSTANTS[224]*ALGEBRAIC[200]*(ALGEBRAIC[198]+CONSTANTS[226])+ ALGEBRAIC[198]*ALGEBRAIC[199]*(CONSTANTS[224]+ALGEBRAIC[201]);
ALGEBRAIC[204] = CONSTANTS[224]*ALGEBRAIC[195]*(ALGEBRAIC[200]+ALGEBRAIC[199])+ ALGEBRAIC[201]*ALGEBRAIC[199]*(CONSTANTS[225]+ALGEBRAIC[195]);
ALGEBRAIC[205] = CONSTANTS[225]*ALGEBRAIC[201]*(ALGEBRAIC[198]+CONSTANTS[226])+ ALGEBRAIC[195]*CONSTANTS[226]*(CONSTANTS[224]+ALGEBRAIC[201]);
ALGEBRAIC[206] = ALGEBRAIC[202]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[207] = ALGEBRAIC[203]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[208] = ALGEBRAIC[204]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[209] = ALGEBRAIC[205]/(ALGEBRAIC[202]+ALGEBRAIC[203]+ALGEBRAIC[204]+ALGEBRAIC[205]);
ALGEBRAIC[211] = ( 3.00000*( ALGEBRAIC[209]*ALGEBRAIC[200] - ALGEBRAIC[206]*ALGEBRAIC[201])+ ALGEBRAIC[208]*ALGEBRAIC[197]) - ALGEBRAIC[207]*ALGEBRAIC[194];
ALGEBRAIC[212] = ALGEBRAIC[207]*CONSTANTS[225] - ALGEBRAIC[206]*CONSTANTS[224];
ALGEBRAIC[213] = 0.200000*CONSTANTS[220]*ALGEBRAIC[210]*( CONSTANTS[7]*ALGEBRAIC[211]+ CONSTANTS[8]*ALGEBRAIC[212]);
ALGEBRAIC[118] = ( 4.00000*ALGEBRAIC[22]*( 1.20000*STATES[2]*exp( 2.00000*ALGEBRAIC[31]) - 0.341000*CONSTANTS[2]))/(exp( 2.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[123] = CONSTANTS[208]*ALGEBRAIC[118]*STATES[38];
ALGEBRAIC[126] = CONSTANTS[208]*ALGEBRAIC[118]*ALGEBRAIC[121];
ALGEBRAIC[137] = ALGEBRAIC[123]+ALGEBRAIC[126];
ALGEBRAIC[124] = CONSTANTS[209]*ALGEBRAIC[118]*STATES[39];
ALGEBRAIC[127] = CONSTANTS[209]*ALGEBRAIC[118]*ALGEBRAIC[122];
ALGEBRAIC[138] = ALGEBRAIC[124]+ALGEBRAIC[127];
ALGEBRAIC[143] = ( ALGEBRAIC[138]*ALGEBRAIC[63]+ ALGEBRAIC[137]*(1.00000 - ALGEBRAIC[63]))*CONSTANTS[65];
ALGEBRAIC[239] = ( CONSTANTS[166]*STATES[8])/(CONSTANTS[167]+STATES[8]);
ALGEBRAIC[237] = ( (1.00000 - CONSTANTS[165])*CONSTANTS[164]*16.0000*ALGEBRAIC[22]*( 1.20000*STATES[8]*exp( 2.00000*ALGEBRAIC[31]) - 0.341000*CONSTANTS[2]))/(exp( 2.00000*ALGEBRAIC[31]) - 1.00000);
ALGEBRAIC[240] = ( (STATES[2] - STATES[8])*1.70000)/0.200000;
ALGEBRAIC[242] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[241] = 1.00000 - 1.00000/(1.00000+exp((STATES[7] - 0.300000)/0.100000));
ALGEBRAIC[243] = (CONSTANTS[0]==2.00000 ? CONSTANTS[191]*ALGEBRAIC[241]*STATES[54]*STATES[55]*(STATES[7] - STATES[2]) : CONSTANTS[170]*ALGEBRAIC[241]*STATES[54]*STATES[55]*(STATES[7] - STATES[2]));
ALGEBRAIC[244] = (CONSTANTS[0]==2.00000 ? CONSTANTS[192]*1.70000*ALGEBRAIC[241]*STATES[54]*STATES[56]*(STATES[7] - STATES[2]) : CONSTANTS[192]*ALGEBRAIC[241]*STATES[54]*STATES[56]*(STATES[7] - STATES[2]));
ALGEBRAIC[245] = (1.00000 - ALGEBRAIC[242])*ALGEBRAIC[243]+ ALGEBRAIC[242]*ALGEBRAIC[244];
ALGEBRAIC[43] = 1.00000/(1.00000+( CONSTANTS[27]*CONSTANTS[28])/pow(CONSTANTS[28]+STATES[2], 2.00000)+( CONSTANTS[29]*CONSTANTS[30])/pow(CONSTANTS[30]+STATES[2], 2.00000));
ALGEBRAIC[246] = ( CONSTANTS[193]*0.00437500*STATES[8])/(STATES[8]+0.000920000);
ALGEBRAIC[247] = ( CONSTANTS[193]*2.75000*0.00437500*STATES[8])/((STATES[8]+0.000920000) - 0.000170000);
ALGEBRAIC[248] = 1.00000/(1.00000+CONSTANTS[18]/ALGEBRAIC[39]);
ALGEBRAIC[250] = CONSTANTS[172]*( (1.00000 - ALGEBRAIC[248])*ALGEBRAIC[246]+ ALGEBRAIC[248]*ALGEBRAIC[247]);
ALGEBRAIC[249] = ( 0.0123000*STATES[7])/15.0000;
ALGEBRAIC[41] = 1.00000/(1.00000+( CONSTANTS[173]*CONSTANTS[24])/pow(CONSTANTS[24]+STATES[8], 2.00000)+( CONSTANTS[25]*CONSTANTS[26])/pow(CONSTANTS[26]+STATES[8], 2.00000));
ALGEBRAIC[45] = 1.00000/(1.00000+( CONSTANTS[31]*CONSTANTS[32])/pow(CONSTANTS[32]+STATES[7], 2.00000));
ALGEBRAIC[14] = ( CONSTANTS[194]*(pow(STATES[8]/CONSTANTS[195], CONSTANTS[197]) - pow(STATES[7]/CONSTANTS[196], CONSTANTS[197])))/(1.00000+pow(STATES[8]/CONSTANTS[195], CONSTANTS[197])+pow(STATES[7]/CONSTANTS[196], CONSTANTS[197]));
ALGEBRAIC[91] = 1.00000/(ALGEBRAIC[89]+ALGEBRAIC[90]);
ALGEBRAIC[92] = ALGEBRAIC[89]/(ALGEBRAIC[89]+ALGEBRAIC[90]);
ALGEBRAIC[97] = 1.00000/(ALGEBRAIC[95]+ALGEBRAIC[96]);
ALGEBRAIC[98] = ALGEBRAIC[95]/(ALGEBRAIC[95]+ALGEBRAIC[96]);
ALGEBRAIC[110] = 1.00000/(ALGEBRAIC[107]+ALGEBRAIC[104]);
ALGEBRAIC[111] = ALGEBRAIC[107]/(ALGEBRAIC[107]+ALGEBRAIC[104]);
ALGEBRAIC[116] = 1.00000/(ALGEBRAIC[114]+ALGEBRAIC[112]);
ALGEBRAIC[117] = ALGEBRAIC[114]/(ALGEBRAIC[114]+ALGEBRAIC[112]);
ALGEBRAIC[125] = ALGEBRAIC[123]*(1.00000 - ALGEBRAIC[63])+ ALGEBRAIC[124]*ALGEBRAIC[63];
ALGEBRAIC[128] = ALGEBRAIC[126]*(1.00000 - ALGEBRAIC[63])+ ALGEBRAIC[127]*ALGEBRAIC[63];
ALGEBRAIC[144] = ALGEBRAIC[143]/ALGEBRAIC[118];
}