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 107 entries in the algebraic variable array.
   There are a total of 35 entries in each of the rate and state variable arrays.
   There are a total of 89 entries in the constant variable array.
 */
/*
 * CONSTANTS[0] is I_hold in component interface (pA_per_pF).
 * CONSTANTS[1] is I_test in component interface (pA_per_pF).
 * CONSTANTS[2] is test_start in component interface (msec).
 * CONSTANTS[3] is test_end in component interface (msec).
 * ALGEBRAIC[0] is Ist in component interface (pA_per_pF).
 * VOI is time in component environment (msec).
 * ALGEBRAIC[104] is I_tot in component membrane_potential (pA_per_pF).
 * ALGEBRAIC[86] is I_Ca_tot in component membrane_potential (pA_per_pF).
 * STATES[0] is v in component membrane_potential (mV).
 * CONSTANTS[73] is Cm in component parameters (uF_per_cm2).
 * ALGEBRAIC[63] is ina in component I_Na (pA_per_pF).
 * ALGEBRAIC[70] is ical in component I_CaL (pA_per_pF).
 * ALGEBRAIC[72] is icat in component I_CaT (pA_per_pF).
 * ALGEBRAIC[73] is ib in component I_b (pA_per_pF).
 * ALGEBRAIC[74] is iherg in component I_HERG (pA_per_pF).
 * ALGEBRAIC[75] is ikcnq1 in component I_KCNQ1 (pA_per_pF).
 * ALGEBRAIC[76] is ikcnq4 in component I_KCNQ4 (pA_per_pF).
 * ALGEBRAIC[77] is ikcnq5 in component I_KCNQ5 (pA_per_pF).
 * ALGEBRAIC[78] is ik1 in component I_K1 (pA_per_pF).
 * ALGEBRAIC[79] is ik2 in component I_K2 (pA_per_pF).
 * ALGEBRAIC[80] is ika in component I_Ka (pA_per_pF).
 * ALGEBRAIC[81] is iBKa in component I_BKa (pA_per_pF).
 * ALGEBRAIC[82] is iBKab in component I_BKab (pA_per_pF).
 * ALGEBRAIC[83] is ih in component I_h (pA_per_pF).
 * ALGEBRAIC[84] is icl in component I_Cl (pA_per_pF).
 * ALGEBRAIC[88] is insna in component I_ns (pA_per_pF).
 * ALGEBRAIC[85] is insca in component I_ns (pA_per_pF).
 * ALGEBRAIC[90] is insk in component I_ns (pA_per_pF).
 * ALGEBRAIC[92] is inak in component I_NaK (pA_per_pF).
 * ALGEBRAIC[101] is inaca in component I_NaCa (pA_per_pF).
 * ALGEBRAIC[105] is J_tot in component Ca_Concentrations (mM_per_msec).
 * ALGEBRAIC[87] is J_Ca_mem in component Ca_Concentrations (mM_per_msec).
 * STATES[1] is cai in component Ca_Concentrations (mM).
 * ALGEBRAIC[100] is jnaca in component J_NaCa (mM_per_msec).
 * ALGEBRAIC[102] is jpmca in component J_PMCA (mM_per_msec).
 * CONSTANTS[68] is buff in component parameters (dimensionless).
 * CONSTANTS[69] is AV in component parameters (cm2_per_uL).
 * CONSTANTS[70] is zca in component parameters (dimensionless).
 * CONSTANTS[72] is frdy in component parameters (coulomb_per_mole).
 * ALGEBRAIC[89] is jcamem_plot in component Ca_Concentrations (M_per_msec).
 * ALGEBRAIC[106] is jpmca_plot in component Ca_Concentrations (M_per_msec).
 * ALGEBRAIC[103] is jnaca_plot in component Ca_Concentrations (M_per_msec).
 * CONSTANTS[4] is conversion in component Ca_Concentrations (mM_to_M).
 * CONSTANTS[11] is ki in component parameters (mM).
 * CONSTANTS[59] is nai in component parameters (mM).
 * CONSTANTS[62] is cli in component parameters (mM).
 * CONSTANTS[63] is ko in component parameters (mM).
 * CONSTANTS[12] is cao in component parameters (mM).
 * CONSTANTS[64] is nao in component parameters (mM).
 * CONSTANTS[66] is clo in component parameters (mM).
 * CONSTANTS[13] is mgo in component parameters (mM).
 * CONSTANTS[14] is zna in component parameters (dimensionless).
 * CONSTANTS[15] is zk in component parameters (dimensionless).
 * CONSTANTS[71] is R in component parameters (joule_per_kelvin_per_kilomole).
 * CONSTANTS[74] is temp in component parameters (kelvin).
 * CONSTANTS[16] is gna in component parameters (nS_per_pF).
 * CONSTANTS[17] is gcal in component parameters (nS_per_pF).
 * CONSTANTS[18] is ecal in component parameters (mV).
 * CONSTANTS[19] is kmca in component parameters (mM).
 * CONSTANTS[20] is gcat in component parameters (nS_per_pF).
 * CONSTANTS[21] is ecat in component parameters (mV).
 * CONSTANTS[22] is gkca in component parameters (nS_per_pF).
 * CONSTANTS[23] is gb in component parameters (nS_per_pF).
 * CONSTANTS[24] is gk1 in component parameters (nS_per_pF).
 * CONSTANTS[25] is gk2 in component parameters (nS_per_pF).
 * CONSTANTS[26] is gbka in component parameters (dimensionless).
 * CONSTANTS[27] is gbkab in component parameters (dimensionless).
 * CONSTANTS[28] is gka in component parameters (nS_per_pF).
 * CONSTANTS[29] is gkq1 in component parameters (nS_per_pF).
 * CONSTANTS[30] is gkq4 in component parameters (nS_per_pF).
 * CONSTANTS[31] is gkq5 in component parameters (nS_per_pF).
 * CONSTANTS[32] is gherg in component parameters (nS_per_pF).
 * CONSTANTS[33] is gcl in component parameters (nS_per_pF).
 * CONSTANTS[34] is gh in component parameters (nS_per_pF).
 * CONSTANTS[35] is gns in component parameters (nS_per_pF).
 * CONSTANTS[36] is PnsK in component parameters (dimensionless).
 * CONSTANTS[37] is PnsNa in component parameters (dimensionless).
 * CONSTANTS[38] is PnsCa in component parameters (dimensionless).
 * CONSTANTS[39] is PnsCs in component parameters (dimensionless).
 * CONSTANTS[40] is gnsCa in component parameters (dimensionless).
 * CONSTANTS[41] is gnsNa in component parameters (dimensionless).
 * CONSTANTS[42] is gnsK in component parameters (dimensionless).
 * CONSTANTS[43] is gnsCs in component parameters (dimensionless).
 * CONSTANTS[75] is ginak in component parameters (pA_per_pF).
 * CONSTANTS[80] is nakKmko in component parameters (mM).
 * CONSTANTS[82] is nakKmnai in component parameters (mM).
 * CONSTANTS[76] is PK in component parameters (dimensionless).
 * CONSTANTS[81] is PNa in component parameters (dimensionless).
 * CONSTANTS[44] is Jpmca in component parameters (mM_per_msec).
 * CONSTANTS[45] is Kmpmca in component parameters (mM).
 * CONSTANTS[46] is npmca in component parameters (dimensionless).
 * CONSTANTS[84] is Jnaca in component parameters (mM_per_msec).
 * CONSTANTS[47] is Kmallo in component parameters (mM).
 * CONSTANTS[48] is nallo in component parameters (dimensionless).
 * CONSTANTS[85] is ksat in component parameters (dimensionless).
 * CONSTANTS[86] is xgamma in component parameters (dimensionless).
 * CONSTANTS[49] is Kmnai in component parameters (mM).
 * CONSTANTS[50] is Kmcai in component parameters (mM).
 * CONSTANTS[51] is Kmnao in component parameters (mM).
 * CONSTANTS[52] is Kmcao in component parameters (mM).
 * CONSTANTS[53] is Fmax in component parameters (uN).
 * CONSTANTS[54] is FKm in component parameters (nM).
 * CONSTANTS[55] is Fn in component parameters (dimensionless).
 * ALGEBRAIC[28] is vFRT in component parameters (dimensionless).
 * CONSTANTS[77] is ena in component parameters (mV).
 * CONSTANTS[78] is ek in component parameters (mV).
 * CONSTANTS[83] is eh in component parameters (mV).
 * CONSTANTS[79] is ecl in component parameters (mV).
 * ALGEBRAIC[58] is enscc in component parameters (mV).
 * ALGEBRAIC[1] is wss in component Ca_dependent_Force (dimensionless).
 * ALGEBRAIC[29] is wtc in component Ca_dependent_Force (msec).
 * CONSTANTS[5] is conversion in component Ca_dependent_Force (nM_to_mM).
 * ALGEBRAIC[2] is Force in component Ca_dependent_Force (uN).
 * STATES[2] is w in component Ca_dependent_Force (dimensionless).
 * ALGEBRAIC[3] is mss in component I_Na (dimensionless).
 * ALGEBRAIC[4] is hss in component I_Na (dimensionless).
 * ALGEBRAIC[30] is mtc in component I_Na (msec).
 * ALGEBRAIC[31] is htc in component I_Na (msec).
 * STATES[3] is m in component I_Na (dimensionless).
 * STATES[4] is h in component I_Na (dimensionless).
 * ALGEBRAIC[5] is dss in component I_CaL (dimensionless).
 * ALGEBRAIC[6] is fss in component I_CaL (dimensionless).
 * ALGEBRAIC[68] is fca in component I_CaL (dimensionless).
 * ALGEBRAIC[32] is dtc in component I_CaL (msec).
 * CONSTANTS[56] is f1tc in component I_CaL (msec).
 * ALGEBRAIC[33] is f2tc in component I_CaL (msec).
 * STATES[5] is d in component I_CaL (dimensionless).
 * STATES[6] is f1 in component I_CaL (dimensionless).
 * STATES[7] is f2 in component I_CaL (dimensionless).
 * ALGEBRAIC[7] is bss in component I_CaT (dimensionless).
 * ALGEBRAIC[8] is gss in component I_CaT (dimensionless).
 * ALGEBRAIC[34] is btc in component I_CaT (msec).
 * ALGEBRAIC[35] is gtc in component I_CaT (msec).
 * STATES[8] is b in component I_CaT (dimensionless).
 * STATES[9] is g in component I_CaT (dimensionless).
 * ALGEBRAIC[9] is hnss in component I_HERG (dimensionless).
 * ALGEBRAIC[10] is hsss in component I_HERG (dimensionless).
 * ALGEBRAIC[36] is hn1tc in component I_HERG (msec).
 * ALGEBRAIC[37] is hn2tc in component I_HERG (msec).
 * ALGEBRAIC[38] is hstc in component I_HERG (msec).
 * STATES[10] is hn1 in component I_HERG (dimensionless).
 * STATES[11] is hn2 in component I_HERG (dimensionless).
 * STATES[12] is hs in component I_HERG (dimensionless).
 * ALGEBRAIC[11] is nq1ss in component I_KCNQ1 (dimensionless).
 * ALGEBRAIC[12] is wq1ss in component I_KCNQ1 (dimensionless).
 * ALGEBRAIC[13] is sq1ss in component I_KCNQ1 (dimensionless).
 * ALGEBRAIC[39] is nq1ftc in component I_KCNQ1 (msec).
 * ALGEBRAIC[40] is nq1stc in component I_KCNQ1 (msec).
 * ALGEBRAIC[41] is wq1tc in component I_KCNQ1 (msec).
 * CONSTANTS[57] is sq1tc in component I_KCNQ1 (msec).
 * STATES[13] is nq1f in component I_KCNQ1 (dimensionless).
 * STATES[14] is nq1s in component I_KCNQ1 (dimensionless).
 * STATES[15] is wq1 in component I_KCNQ1 (dimensionless).
 * STATES[16] is sq1 in component I_KCNQ1 (dimensionless).
 * ALGEBRAIC[14] is nq4ss in component I_KCNQ4 (dimensionless).
 * ALGEBRAIC[15] is sq4ss in component I_KCNQ4 (dimensionless).
 * ALGEBRAIC[42] is nq4tc in component I_KCNQ4 (msec).
 * ALGEBRAIC[43] is sq4tc in component I_KCNQ4 (msec).
 * STATES[17] is nq4 in component I_KCNQ4 (dimensionless).
 * STATES[18] is sq4 in component I_KCNQ4 (dimensionless).
 * ALGEBRAIC[16] is nq5ss in component I_KCNQ5 (dimensionless).
 * ALGEBRAIC[17] is wq5ss in component I_KCNQ5 (dimensionless).
 * ALGEBRAIC[18] is sq5ss in component I_KCNQ5 (dimensionless).
 * ALGEBRAIC[44] is nq5ftc in component I_KCNQ5 (msec).
 * CONSTANTS[58] is nq5stc in component I_KCNQ5 (msec).
 * ALGEBRAIC[45] is wq5tc in component I_KCNQ5 (msec).
 * ALGEBRAIC[46] is sq5tc in component I_KCNQ5 (msec).
 * STATES[19] is nq5f in component I_KCNQ5 (dimensionless).
 * STATES[20] is nq5s in component I_KCNQ5 (dimensionless).
 * STATES[21] is wq5 in component I_KCNQ5 (dimensionless).
 * STATES[22] is sq5 in component I_KCNQ5 (dimensionless).
 * ALGEBRAIC[19] is qss in component I_K1 (dimensionless).
 * ALGEBRAIC[20] is rss in component I_K1 (dimensionless).
 * ALGEBRAIC[47] is qtc in component I_K1 (msec).
 * ALGEBRAIC[48] is r1tc in component I_K1 (msec).
 * ALGEBRAIC[49] is r2tc in component I_K1 (msec).
 * STATES[23] is q in component I_K1 (dimensionless).
 * STATES[24] is r1 in component I_K1 (dimensionless).
 * STATES[25] is r2 in component I_K1 (dimensionless).
 * ALGEBRAIC[21] is pss in component I_K2 (dimensionless).
 * ALGEBRAIC[22] is kss in component I_K2 (dimensionless).
 * ALGEBRAIC[50] is ptc in component I_K2 (msec).
 * ALGEBRAIC[51] is k1tc in component I_K2 (msec).
 * ALGEBRAIC[52] is k2tc in component I_K2 (msec).
 * STATES[26] is p in component I_K2 (dimensionless).
 * STATES[27] is k1 in component I_K2 (dimensionless).
 * STATES[28] is k2 in component I_K2 (dimensionless).
 * ALGEBRAIC[23] is sss in component I_Ka (dimensionless).
 * ALGEBRAIC[24] is xss in component I_Ka (dimensionless).
 * ALGEBRAIC[53] is stc in component I_Ka (msec).
 * ALGEBRAIC[54] is xtc in component I_Ka (msec).
 * STATES[29] is s in component I_Ka (dimensionless).
 * STATES[30] is x in component I_Ka (dimensionless).
 * ALGEBRAIC[25] is xass_z in component I_BKa (dimensionless).
 * ALGEBRAIC[55] is xass_vh in component I_BKa (mV).
 * CONSTANTS[6] is conversion in component I_BKa (mM_to_M).
 * ALGEBRAIC[59] is xass in component I_BKa (dimensionless).
 * ALGEBRAIC[64] is xatc in component I_BKa (msec).
 * STATES[31] is xa in component I_BKa (dimensionless).
 * ALGEBRAIC[26] is xabss_z in component I_BKab (dimensionless).
 * ALGEBRAIC[56] is xabss_vh in component I_BKab (mV).
 * CONSTANTS[7] is conversion in component I_BKab (mM_to_M).
 * ALGEBRAIC[60] is xabss in component I_BKab (dimensionless).
 * ALGEBRAIC[65] is xabtc in component I_BKab (msec).
 * STATES[32] is xab in component I_BKab (dimensionless).
 * ALGEBRAIC[27] is yss in component I_h (dimensionless).
 * ALGEBRAIC[66] is ytc in component I_h (msec).
 * ALGEBRAIC[57] is ya in component I_h (per_msec).
 * ALGEBRAIC[61] is yb in component I_h (per_msec).
 * STATES[33] is y in component I_h (dimensionless).
 * ALGEBRAIC[69] is css in component I_Cl (dimensionless).
 * ALGEBRAIC[71] is ctc in component I_Cl (msec).
 * ALGEBRAIC[62] is K1cl in component I_Cl (mM).
 * ALGEBRAIC[67] is K2cl in component I_Cl (dimensionless).
 * STATES[34] is c in component I_Cl (dimensionless).
 * CONSTANTS[60] is fmg in component I_ns (dimensionless).
 * CONSTANTS[67] is gs_nao in component I_ns (dimensionless).
 * CONSTANTS[61] is gs_cao in component I_ns (dimensionless).
 * CONSTANTS[65] is gs_ko in component I_ns (dimensionless).
 * CONSTANTS[8] is tinyamount in component I_ns (mM).
 * ALGEBRAIC[91] is fnak in component I_NaK (dimensionless).
 * CONSTANTS[87] is knak in component I_NaK (dimensionless).
 * CONSTANTS[88] is nnak in component I_NaK (dimensionless).
 * CONSTANTS[9] is inaca_sign in component I_NaCa (dimensionless).
 * ALGEBRAIC[93] is f1naca in component J_NaCa (dimensionless).
 * ALGEBRAIC[94] is f2naca in component J_NaCa (dimensionless).
 * ALGEBRAIC[95] is fallo in component J_NaCa (dimensionless).
 * ALGEBRAIC[96] is naca_Eup in component J_NaCa (mM4).
 * ALGEBRAIC[97] is naca_Ed1 in component J_NaCa (dimensionless).
 * ALGEBRAIC[98] is naca_Ed2 in component J_NaCa (mM4).
 * ALGEBRAIC[99] is naca_Ed3 in component J_NaCa (mM4).
 * CONSTANTS[10] is jnaca_sign in component J_NaCa (dimensionless).
 * RATES[0] is d/dt v in component membrane_potential (mV).
 * RATES[1] is d/dt cai in component Ca_Concentrations (mM).
 * RATES[2] is d/dt w in component Ca_dependent_Force (dimensionless).
 * RATES[3] is d/dt m in component I_Na (dimensionless).
 * RATES[4] is d/dt h in component I_Na (dimensionless).
 * RATES[5] is d/dt d in component I_CaL (dimensionless).
 * RATES[6] is d/dt f1 in component I_CaL (dimensionless).
 * RATES[7] is d/dt f2 in component I_CaL (dimensionless).
 * RATES[8] is d/dt b in component I_CaT (dimensionless).
 * RATES[9] is d/dt g in component I_CaT (dimensionless).
 * RATES[10] is d/dt hn1 in component I_HERG (dimensionless).
 * RATES[11] is d/dt hn2 in component I_HERG (dimensionless).
 * RATES[12] is d/dt hs in component I_HERG (dimensionless).
 * RATES[13] is d/dt nq1f in component I_KCNQ1 (dimensionless).
 * RATES[14] is d/dt nq1s in component I_KCNQ1 (dimensionless).
 * RATES[15] is d/dt wq1 in component I_KCNQ1 (dimensionless).
 * RATES[16] is d/dt sq1 in component I_KCNQ1 (dimensionless).
 * RATES[17] is d/dt nq4 in component I_KCNQ4 (dimensionless).
 * RATES[18] is d/dt sq4 in component I_KCNQ4 (dimensionless).
 * RATES[19] is d/dt nq5f in component I_KCNQ5 (dimensionless).
 * RATES[20] is d/dt nq5s in component I_KCNQ5 (dimensionless).
 * RATES[21] is d/dt wq5 in component I_KCNQ5 (dimensionless).
 * RATES[22] is d/dt sq5 in component I_KCNQ5 (dimensionless).
 * RATES[23] is d/dt q in component I_K1 (dimensionless).
 * RATES[24] is d/dt r1 in component I_K1 (dimensionless).
 * RATES[25] is d/dt r2 in component I_K1 (dimensionless).
 * RATES[26] is d/dt p in component I_K2 (dimensionless).
 * RATES[27] is d/dt k1 in component I_K2 (dimensionless).
 * RATES[28] is d/dt k2 in component I_K2 (dimensionless).
 * RATES[29] is d/dt s in component I_Ka (dimensionless).
 * RATES[30] is d/dt x in component I_Ka (dimensionless).
 * RATES[31] is d/dt xa in component I_BKa (dimensionless).
 * RATES[32] is d/dt xab in component I_BKab (dimensionless).
 * RATES[33] is d/dt y in component I_h (dimensionless).
 * RATES[34] is d/dt c in component I_Cl (dimensionless).
 */
void
initConsts(double* CONSTANTS, double* RATES, double *STATES)
{
CONSTANTS[0] = 0;
CONSTANTS[1] = -0.25;
CONSTANTS[2] = 1000;
CONSTANTS[3] = 50000;
STATES[0] = -50.80774403486136;
STATES[1] = 0.0001235555354004079;
CONSTANTS[4] = 1000;
CONSTANTS[5] = 1e-6;
STATES[2] = 0.2768302028689621;
STATES[3] = 0.166998688814229;
STATES[4] = 0.3156075507278521;
STATES[5] = 0.01605749091924106;
STATES[6] = 0.861723329545759;
STATES[7] = 0.8617233295451014;
STATES[8] = 0.5857399935992883;
STATES[9] = 0.02817518341064734;
STATES[10] = 0.02498997383730429;
STATES[11] = 0.02498997383730429;
STATES[12] = 0.5292140214748325;
STATES[13] = 0.09043683263784785;
STATES[14] = 0.09043683263784785;
STATES[15] = 0.9230513956601629;
STATES[16] = 0.7426740827665872;
STATES[17] = 0.1081102112425531;
STATES[18] = 0.6280622663818354;
STATES[19] = 0.2618890409031491;
STATES[20] = 0.2618890409031491;
STATES[21] = 0.9230513956601629;
STATES[22] = 0.6280622663818354;
STATES[23] = 0.22560249352574;
STATES[24] = 0.1261674553968813;
STATES[25] = 0.1261674420211442;
STATES[26] = 0.1358747732875166;
STATES[27] = 0.9944827384537837;
STATES[28] = 0.9944827384537837;
STATES[29] = 0.04562272513582834;
STATES[30] = 0.06162789823439722;
CONSTANTS[6] = 1000.0;
STATES[31] = 0.0003575122973592095;
CONSTANTS[7] = 1000.0;
STATES[32] = 0.002673927875795617;
STATES[33] = 0.001821587846781853;
STATES[34] = 0.0006695090454068198;
CONSTANTS[8] = 1e-8;
CONSTANTS[9] = -1;
CONSTANTS[10] = -1;
CONSTANTS[11] = 140.000;
CONSTANTS[12] = 2.50000;
CONSTANTS[13] = 0.500000;
CONSTANTS[14] = 1.00000;
CONSTANTS[15] = 1.00000;
CONSTANTS[16] = 0.00000;
CONSTANTS[17] = 0.600000;
CONSTANTS[18] = 45.0000;
CONSTANTS[19] = 0.00100000;
CONSTANTS[20] = 0.0580000;
CONSTANTS[21] = 42.0000;
CONSTANTS[22] = 0.800000;
CONSTANTS[23] = 0.00000;
CONSTANTS[24] = 0.240000;
CONSTANTS[25] = 0.0320000;
CONSTANTS[26] = 0.200000;
CONSTANTS[27] = 0.100000;
CONSTANTS[28] = 0.160000;
CONSTANTS[29] = 0.00320000;
CONSTANTS[30] = 0.0240000;
CONSTANTS[31] = 0.0160000;
CONSTANTS[32] = 0.0800000;
CONSTANTS[33] = 0.187500;
CONSTANTS[34] = 0.0542000;
CONSTANTS[35] = 0.0123000;
CONSTANTS[36] = 1.30000;
CONSTANTS[37] = 0.900000;
CONSTANTS[38] = 0.890000;
CONSTANTS[39] = 1.00000;
CONSTANTS[40] = 0.500000;
CONSTANTS[41] = 1.00000;
CONSTANTS[42] = 1.19000;
CONSTANTS[43] = 1.60000;
CONSTANTS[44] = 3.50000e-07;
CONSTANTS[45] = 0.000500000;
CONSTANTS[46] = 2.00000;
CONSTANTS[47] = 0.000300000;
CONSTANTS[48] = 4.00000;
CONSTANTS[49] = 30.0000;
CONSTANTS[50] = 0.00700000;
CONSTANTS[51] = 87.5000;
CONSTANTS[52] = 1.30000;
CONSTANTS[53] = 3.00000;
CONSTANTS[54] = 161.301;
CONSTANTS[55] = 3.60205;
CONSTANTS[56] = 12.0000;
CONSTANTS[57] = 50000.0;
CONSTANTS[58] = 1000.00;
CONSTANTS[59] = 4.00000;
CONSTANTS[60] = 0.108043+0.903902/(1.00000+pow(CONSTANTS[13]/0.281007, 1.29834));
CONSTANTS[61] = ( (1.00000/0.000525000)*0.0300000)/(1.00000+pow(150.000/(CONSTANTS[12]+CONSTANTS[8]), 2.00000));
CONSTANTS[62] = 46.0000;
CONSTANTS[63] = 6.00000;
CONSTANTS[64] = 130.000;
CONSTANTS[65] = ( (1.00000/0.0123000)*0.0300000)/(1.00000+pow(150.000/(CONSTANTS[63]+CONSTANTS[8]), 2.00000));
CONSTANTS[66] = 130.000;
CONSTANTS[67] = ( (1.00000/0.0123000)*0.0300000)/(1.00000+pow(150.000/(CONSTANTS[64]+CONSTANTS[8]), 2.00000));
CONSTANTS[68] = 0.0150000;
CONSTANTS[69] = 4.00000;
CONSTANTS[70] = 2.00000;
CONSTANTS[71] = 8314.00;
CONSTANTS[72] = 96485.0;
CONSTANTS[73] = 1.00000;
CONSTANTS[74] = 308.000;
CONSTANTS[75] = 1.70000;
CONSTANTS[76] = 1.00000;
CONSTANTS[77] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log(CONSTANTS[64]/CONSTANTS[59]);
CONSTANTS[78] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log(CONSTANTS[63]/CONSTANTS[11]);
CONSTANTS[79] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log(CONSTANTS[62]/CONSTANTS[66]);
CONSTANTS[80] = 2.00000;
CONSTANTS[81] = 0.350000;
CONSTANTS[82] = 22.0000;
CONSTANTS[83] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log((CONSTANTS[63]+ (CONSTANTS[81]/CONSTANTS[76])*CONSTANTS[64])/(CONSTANTS[11]+ (CONSTANTS[81]/CONSTANTS[76])*CONSTANTS[59]));
CONSTANTS[84] = 3.50000e-06;
CONSTANTS[85] = 0.270000;
CONSTANTS[86] = 0.350000;
CONSTANTS[87] = 1.00000/(1.00000+pow(CONSTANTS[80]/CONSTANTS[63], 1.50000));
CONSTANTS[88] = 1.00000/(1.00000+pow(CONSTANTS[82]/CONSTANTS[59], 2.00000));
}
void
computeRates(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
ALGEBRAIC[6] = 1.00000/(1.00000+exp((STATES[0]+38.0000)/7.00000));
RATES[6] = (ALGEBRAIC[6] - STATES[6])/CONSTANTS[56];
ALGEBRAIC[13] = 0.340000+0.660000/(1.00000+exp((STATES[0]+45.3000)/12.3000));
RATES[16] = (ALGEBRAIC[13] - STATES[16])/CONSTANTS[57];
ALGEBRAIC[16] = 1.00000/(1.00000+exp(- (STATES[0]+36.5500)/13.7600));
RATES[20] = (ALGEBRAIC[16] - STATES[20])/CONSTANTS[58];
ALGEBRAIC[1] = 1.00000/(1.00000+pow(( CONSTANTS[54]*CONSTANTS[5])/STATES[1], CONSTANTS[55]));
ALGEBRAIC[29] =  4000.00*(0.234845+(1.00000 - 0.234845)/(1.00000+pow(STATES[1]/( CONSTANTS[54]*CONSTANTS[5]), CONSTANTS[55])));
RATES[2] = (ALGEBRAIC[1] - STATES[2])/ALGEBRAIC[29];
ALGEBRAIC[3] = 1.00000/(1.00000+exp(- (STATES[0]+35.9584)/9.24013));
ALGEBRAIC[30] = 0.250000+7.00000/(1.00000+exp((STATES[0]+38.0000)/10.0000));
RATES[3] = (ALGEBRAIC[3] - STATES[3])/ALGEBRAIC[30];
ALGEBRAIC[4] = 1.00000/(1.00000+exp((STATES[0]+57.0000)/8.00000));
ALGEBRAIC[31] = 0.900000+1002.85/(1.00000+pow((STATES[0]+47.5000)/1.50000, 2.00000));
RATES[4] = (ALGEBRAIC[4] - STATES[4])/ALGEBRAIC[31];
ALGEBRAIC[5] = 1.00000/(1.00000+exp(- (STATES[0]+22.0000)/7.00000));
ALGEBRAIC[32] = 2.29000+5.70000/(1.00000+pow((STATES[0]+29.9700)/9.00000, 2.00000));
RATES[5] = (ALGEBRAIC[5] - STATES[5])/ALGEBRAIC[32];
ALGEBRAIC[33] =  90.9699*(1.00000 - 1.00000/( (1.00000+exp((STATES[0]+13.9629)/45.3782))*(1.00000+exp(- (STATES[0]+9.49866)/3.39450))));
RATES[7] = (ALGEBRAIC[6] - STATES[7])/ALGEBRAIC[33];
ALGEBRAIC[7] = 1.00000/(1.00000+exp(- (STATES[0]+54.2300)/9.88000));
ALGEBRAIC[34] = 0.450000+3.90000/(1.00000+pow((STATES[0]+66.0000)/26.0000, 2.00000));
RATES[8] = (ALGEBRAIC[7] - STATES[8])/ALGEBRAIC[34];
ALGEBRAIC[8] = 0.0200000+0.980000/(1.00000+exp((STATES[0]+72.9780)/4.64000));
ALGEBRAIC[35] =  150.000*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 417.430)/203.180))*(1.00000+exp(- (STATES[0]+61.1100)/8.07000))));
RATES[9] = (ALGEBRAIC[8] - STATES[9])/ALGEBRAIC[35];
ALGEBRAIC[9] = 1.00000/(1.00000+exp(- (STATES[0]+16.0000)/9.50000));
ALGEBRAIC[36] = 46.0999+1685.76/( (1.00000+exp(- (STATES[0]+40.8489)/13.7802))*(1.00000+exp((STATES[0]+20.6372)/15.1113)));
RATES[10] = (ALGEBRAIC[9] - STATES[10])/ALGEBRAIC[36];
ALGEBRAIC[37] = 475.667+16321.6/( (1.00000+exp(- (STATES[0]+41.8328)/6.96673))*(1.00000+exp((STATES[0]+23.2432)/21.2949)));
RATES[11] = (ALGEBRAIC[9] - STATES[11])/ALGEBRAIC[37];
ALGEBRAIC[10] = 1.00000/(1.00000+exp((STATES[0]+48.0000)/24.0000));
ALGEBRAIC[38] = 19.7864/(1.00000+pow((STATES[0]+20.7136)/44.2868, 2.00000)) - 0.378843;
RATES[12] = (ALGEBRAIC[10] - STATES[12])/ALGEBRAIC[38];
ALGEBRAIC[11] = 1.00000/(1.00000+exp(- (STATES[0]+22.0000)/12.4800));
ALGEBRAIC[39] = 395.300/(1.00000+pow((STATES[0]+38.1000)/33.5900, 2.00000));
RATES[13] = (ALGEBRAIC[11] - STATES[13])/ALGEBRAIC[39];
ALGEBRAIC[40] = (5503.00+5345.40/(1.00000+pow(10.0000,  (- 23.9000 - STATES[0])*- 0.0282700))) - 4590.60/(1.00000+pow(10.0000,  (STATES[0]+14.1500)*- 0.0357000));
RATES[14] = (ALGEBRAIC[11] - STATES[14])/ALGEBRAIC[40];
ALGEBRAIC[12] = 0.490000+0.510000/(1.00000+exp((STATES[0]+1.08400)/28.7800));
ALGEBRAIC[41] = 5.44000+29.2000/(1.00000+pow((STATES[0]+48.0900)/48.8300, 2.00000));
RATES[15] = (ALGEBRAIC[12] - STATES[15])/ALGEBRAIC[41];
ALGEBRAIC[14] = 1.00000/(1.00000+exp(- (STATES[0]+15.0400)/16.9500));
ALGEBRAIC[42] = 10.0000+895.900/(1.00000+exp((- 18.0100 - STATES[0])/31.0400));
RATES[17] = (ALGEBRAIC[14] - STATES[17])/ALGEBRAIC[42];
ALGEBRAIC[15] = 0.405800/(1.00000+exp((STATES[0]+86.8400)/15.0500))+0.594200/(1.00000+exp((STATES[0] - 70.1300)/13.3700));
ALGEBRAIC[43] = 1077.00+185845./(1.00000+pow((STATES[0] - 39.4400)/7.34400, 2.00000));
RATES[18] = (ALGEBRAIC[15] - STATES[18])/ALGEBRAIC[43];
ALGEBRAIC[44] = 37.5100+539.000/(1.00000+pow((STATES[0]+40.2400)/17.7200, 2.00000));
RATES[19] = (ALGEBRAIC[16] - STATES[19])/ALGEBRAIC[44];
ALGEBRAIC[17] = 0.490000+0.510000/(1.00000+exp((STATES[0]+1.08400)/28.7800));
ALGEBRAIC[45] = 5.44000+29.2000/(1.00000+pow((STATES[0]+48.0900)/48.8300, 2.00000));
RATES[21] = (ALGEBRAIC[17] - STATES[21])/ALGEBRAIC[45];
ALGEBRAIC[18] = 0.405800/(1.00000+exp((STATES[0]+86.8400)/15.0500))+0.594200/(1.00000+exp((STATES[0] - 70.1300)/13.3700));
ALGEBRAIC[46] = 1077.00+185845./(1.00000+pow((STATES[0] - 39.4400)/7.34400, 2.00000));
RATES[22] = (ALGEBRAIC[18] - STATES[22])/ALGEBRAIC[46];
ALGEBRAIC[19] = 0.978613/(1.00000+exp(- (STATES[0]+18.6736)/26.6606));
ALGEBRAIC[47] = 500.000/(1.00000+pow((STATES[0]+60.7100)/15.7900, 2.00000));
RATES[23] = (ALGEBRAIC[19] - STATES[23])/ALGEBRAIC[47];
ALGEBRAIC[20] = 1.00000/(1.00000+exp((STATES[0]+63.0000)/6.30000));
ALGEBRAIC[48] = 5000.00/(1.00000+pow((STATES[0]+62.7133)/35.8611, 2.00000));
RATES[24] = (ALGEBRAIC[20] - STATES[24])/ALGEBRAIC[48];
ALGEBRAIC[49] = 30000.0+220000./(1.00000+exp((STATES[0]+22.0000)/4.00000));
RATES[25] = (ALGEBRAIC[20] - STATES[25])/ALGEBRAIC[49];
ALGEBRAIC[21] = 0.948000/(1.00000+exp(- (STATES[0]+17.9100)/18.4000));
ALGEBRAIC[50] = 100.000/(1.00000+pow((STATES[0]+64.1000)/28.6700, 2.00000));
RATES[26] = (ALGEBRAIC[21] - STATES[26])/ALGEBRAIC[50];
ALGEBRAIC[22] = 1.00000/(1.00000+exp((STATES[0]+21.2000)/5.70000));
ALGEBRAIC[51] =  1.00000e+06*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 315.000)/50.0000))*(1.00000+exp(- (STATES[0]+74.9000)/8.00000))));
RATES[27] = (ALGEBRAIC[22] - STATES[27])/ALGEBRAIC[51];
ALGEBRAIC[52] =  2.50000e+06*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 132.868)/25.3992))*(1.00000+exp(- (STATES[0]+24.9203)/2.67915))));
RATES[28] = (ALGEBRAIC[22] - STATES[28])/ALGEBRAIC[52];
ALGEBRAIC[23] = 1.00000/(1.00000+exp(- (STATES[0]+27.7900)/7.57000));
ALGEBRAIC[53] = 17.0000/(1.00000+pow((STATES[0]+20.5232)/35.0000, 2.00000));
RATES[29] = (ALGEBRAIC[23] - STATES[29])/ALGEBRAIC[53];
ALGEBRAIC[24] = 0.0200000+0.980000/(1.00000+exp((STATES[0]+69.5000)/6.00000));
ALGEBRAIC[54] = 7.50000+10.0000/(1.00000+pow((STATES[0]+34.1765)/120.000, 2.00000));
RATES[30] = (ALGEBRAIC[24] - STATES[30])/ALGEBRAIC[54];
ALGEBRAIC[25] = - 0.749234/(1.00000+pow(( STATES[1]*CONSTANTS[6] - 0.0630535)/0.161942, 2.00000))+8.38384/(1.00000+pow(( STATES[1]*CONSTANTS[6]+1538.29)/739.057, 2.00000));
ALGEBRAIC[55] = 5011.47/(1.00000+pow(( STATES[1]*CONSTANTS[6]+0.237503)/0.000239278, 0.422910)) - 37.5137;
ALGEBRAIC[59] = 1.00000/(1.00000+exp(( - ALGEBRAIC[25]*CONSTANTS[72]*(STATES[0] - ALGEBRAIC[55]))/( CONSTANTS[71]*CONSTANTS[74])));
ALGEBRAIC[64] = 2.40914/(1.00000+pow((STATES[0] - 158.779)/- 52.1497, 2.00000));
RATES[31] = (ALGEBRAIC[59] - STATES[31])/ALGEBRAIC[64];
ALGEBRAIC[26] = - 0.681249/(1.00000+pow(( STATES[1]*CONSTANTS[7] - 0.218988)/0.428335, 2.00000))+1.40001/(1.00000+pow(( STATES[1]*CONSTANTS[7]+228.710)/684.946, 2.00000));
ALGEBRAIC[56] = 8540.23/(1.00000+pow(( STATES[1]*CONSTANTS[7]+0.401189)/0.00399115, 0.668054)) - 109.275;
ALGEBRAIC[60] = 1.00000/(1.00000+exp(( - ALGEBRAIC[26]*CONSTANTS[72]*(STATES[0] - ALGEBRAIC[56]))/( CONSTANTS[71]*CONSTANTS[74])));
ALGEBRAIC[65] = 13.8049/(1.00000+pow((STATES[0] - 153.019)/66.4952, 2.00000));
RATES[32] = (ALGEBRAIC[60] - STATES[32])/ALGEBRAIC[65];
ALGEBRAIC[27] = 1.00000/(1.00000+exp((STATES[0]+105.390)/8.65530));
ALGEBRAIC[57] =  3.50000e-06*exp( - 0.0497000*STATES[0]);
ALGEBRAIC[61] =  0.0400300*exp( 0.0521100*STATES[0]);
ALGEBRAIC[66] = 1.00000/(ALGEBRAIC[57]+ALGEBRAIC[61]);
RATES[33] = (ALGEBRAIC[27] - STATES[33])/ALGEBRAIC[66];
ALGEBRAIC[28] = ( STATES[0]*CONSTANTS[72])/( CONSTANTS[71]*CONSTANTS[74]);
ALGEBRAIC[62] =  0.000600000*exp( 2.53000*ALGEBRAIC[28]);
ALGEBRAIC[67] =  0.100000*exp( - 5.00000*ALGEBRAIC[28]);
ALGEBRAIC[69] = 1.00000/(1.00000+ ALGEBRAIC[67]*(pow(ALGEBRAIC[62]/STATES[1], 2.00000)+ALGEBRAIC[62]/STATES[1]+1.00000));
ALGEBRAIC[71] = - 160.000+210.000/(1.00000+exp((STATES[0]+4.56000)/11.6200))+170.000/(1.00000+exp(- (STATES[0]+25.5000)/11.6200));
RATES[34] = (ALGEBRAIC[69] - STATES[34])/ALGEBRAIC[71];
ALGEBRAIC[0] = (VOI>CONSTANTS[2]&&VOI<CONSTANTS[3] ? CONSTANTS[1] : CONSTANTS[0]);
ALGEBRAIC[63] =  CONSTANTS[16]*STATES[3]*STATES[3]*STATES[3]*STATES[4]*(STATES[0] - CONSTANTS[77]);
ALGEBRAIC[68] = 1.00000/(1.00000+pow(STATES[1]/CONSTANTS[19], 4.00000));
ALGEBRAIC[70] =  CONSTANTS[17]*ALGEBRAIC[68]*STATES[5]*STATES[5]*( 0.800000*STATES[6]+ 0.200000*STATES[7])*(STATES[0] - CONSTANTS[18]);
ALGEBRAIC[72] =  CONSTANTS[20]*STATES[8]*STATES[8]*STATES[9]*(STATES[0] - CONSTANTS[21]);
ALGEBRAIC[73] =  CONSTANTS[23]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[74] =  CONSTANTS[32]*( 0.800000*STATES[10]+ 0.200000*STATES[11])*STATES[12]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[75] =  CONSTANTS[29]*( 0.300000*STATES[13]+ 0.700000*STATES[14])*STATES[15]*STATES[16]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[76] =  CONSTANTS[30]*STATES[17]*STATES[18]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[77] =  CONSTANTS[31]*( 0.200000*STATES[19]+ 0.800000*STATES[20])*STATES[21]*STATES[22]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[78] =  CONSTANTS[24]*STATES[23]*STATES[23]*( 0.380000*STATES[24]+ 0.630000*STATES[25])*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[79] =  CONSTANTS[25]*STATES[26]*STATES[26]*( 0.750000*STATES[27]+ 0.250000*STATES[28])*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[80] =  CONSTANTS[28]*STATES[29]*STATES[30]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[81] =  CONSTANTS[22]*CONSTANTS[26]*STATES[31]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[82] =  CONSTANTS[22]*CONSTANTS[27]*STATES[32]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[83] =  CONSTANTS[34]*STATES[33]*(STATES[0] - CONSTANTS[83]);
ALGEBRAIC[84] =  CONSTANTS[33]*STATES[34]*(STATES[0] - CONSTANTS[79]);
ALGEBRAIC[58] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log(( CONSTANTS[36]*CONSTANTS[63]+ CONSTANTS[37]*CONSTANTS[64]+( 4.00000*CONSTANTS[38]*CONSTANTS[12])/(1.00000+exp(ALGEBRAIC[28])))/( CONSTANTS[36]*CONSTANTS[11]+ CONSTANTS[37]*CONSTANTS[59]+( 4.00000*CONSTANTS[38]*STATES[1])/(1.00000+exp(ALGEBRAIC[28]))));
ALGEBRAIC[88] =  CONSTANTS[60]*CONSTANTS[67]*CONSTANTS[41]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[85] =  CONSTANTS[60]*CONSTANTS[61]*CONSTANTS[40]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[90] =  CONSTANTS[60]*CONSTANTS[65]*CONSTANTS[42]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[91] = 1.00000/(1.00000+ 0.124500*exp( - 0.100000*ALGEBRAIC[28])+ 0.00219000*exp(CONSTANTS[64]/49.7100)*exp( - 1.90000*ALGEBRAIC[28]));
ALGEBRAIC[92] =  CONSTANTS[75]*CONSTANTS[87]*CONSTANTS[88]*ALGEBRAIC[91];
ALGEBRAIC[95] = 1.00000/(1.00000+pow(CONSTANTS[47]/STATES[1], CONSTANTS[48]));
ALGEBRAIC[93] = exp( (CONSTANTS[86] - 1.00000)*ALGEBRAIC[28]);
ALGEBRAIC[94] = exp( CONSTANTS[86]*ALGEBRAIC[28]);
ALGEBRAIC[96] =  pow(CONSTANTS[59], 3.00000)*CONSTANTS[12]*ALGEBRAIC[94] -  pow(CONSTANTS[64], 3.00000)*STATES[1]*ALGEBRAIC[93];
ALGEBRAIC[97] = 1.00000+ CONSTANTS[85]*ALGEBRAIC[93];
ALGEBRAIC[98] =  CONSTANTS[52]*pow(CONSTANTS[59], 3.00000)+ pow(CONSTANTS[51], 3.00000)*STATES[1]+ pow(CONSTANTS[49], 3.00000)*CONSTANTS[12]*(1.00000+STATES[1]/CONSTANTS[50]);
ALGEBRAIC[99] =  CONSTANTS[12]*pow(CONSTANTS[59], 3.00000)+ pow(CONSTANTS[64], 3.00000)*STATES[1]+ pow(CONSTANTS[64], 3.00000)*CONSTANTS[50]*(1.00000+pow(CONSTANTS[59]/CONSTANTS[49], 3.00000));
ALGEBRAIC[100] = ( CONSTANTS[10]*CONSTANTS[84]*ALGEBRAIC[95]*ALGEBRAIC[96])/( ALGEBRAIC[97]*(ALGEBRAIC[98]+ALGEBRAIC[99]));
ALGEBRAIC[101] =  (( 0.500000*CONSTANTS[70]*CONSTANTS[72])/( CONSTANTS[69]*CONSTANTS[73]*CONSTANTS[68]))*CONSTANTS[9]*ALGEBRAIC[100];
ALGEBRAIC[104] = ALGEBRAIC[63]+ALGEBRAIC[83]+ALGEBRAIC[101]+ALGEBRAIC[92]+ALGEBRAIC[70]+ALGEBRAIC[72]+ALGEBRAIC[84]+ALGEBRAIC[74]+ALGEBRAIC[75]+ALGEBRAIC[76]+ALGEBRAIC[77]+ALGEBRAIC[78]+ALGEBRAIC[79]+ALGEBRAIC[80]+ALGEBRAIC[81]+ALGEBRAIC[82]+ALGEBRAIC[88]+ALGEBRAIC[90]+ALGEBRAIC[85]+ALGEBRAIC[73];
RATES[0] = - (ALGEBRAIC[104]+ALGEBRAIC[0]);
ALGEBRAIC[86] = ALGEBRAIC[70]+ALGEBRAIC[72]+ALGEBRAIC[85];
ALGEBRAIC[87] =  (( CONSTANTS[69]*CONSTANTS[73]*CONSTANTS[68])/( CONSTANTS[70]*CONSTANTS[72]))*ALGEBRAIC[86];
ALGEBRAIC[102] = CONSTANTS[44]/(1.00000+pow(CONSTANTS[45]/STATES[1], CONSTANTS[46]));
ALGEBRAIC[105] = ALGEBRAIC[87]+ALGEBRAIC[100]+ALGEBRAIC[102];
RATES[1] = - ALGEBRAIC[105];
}
void
computeVariables(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
ALGEBRAIC[6] = 1.00000/(1.00000+exp((STATES[0]+38.0000)/7.00000));
ALGEBRAIC[13] = 0.340000+0.660000/(1.00000+exp((STATES[0]+45.3000)/12.3000));
ALGEBRAIC[16] = 1.00000/(1.00000+exp(- (STATES[0]+36.5500)/13.7600));
ALGEBRAIC[1] = 1.00000/(1.00000+pow(( CONSTANTS[54]*CONSTANTS[5])/STATES[1], CONSTANTS[55]));
ALGEBRAIC[29] =  4000.00*(0.234845+(1.00000 - 0.234845)/(1.00000+pow(STATES[1]/( CONSTANTS[54]*CONSTANTS[5]), CONSTANTS[55])));
ALGEBRAIC[3] = 1.00000/(1.00000+exp(- (STATES[0]+35.9584)/9.24013));
ALGEBRAIC[30] = 0.250000+7.00000/(1.00000+exp((STATES[0]+38.0000)/10.0000));
ALGEBRAIC[4] = 1.00000/(1.00000+exp((STATES[0]+57.0000)/8.00000));
ALGEBRAIC[31] = 0.900000+1002.85/(1.00000+pow((STATES[0]+47.5000)/1.50000, 2.00000));
ALGEBRAIC[5] = 1.00000/(1.00000+exp(- (STATES[0]+22.0000)/7.00000));
ALGEBRAIC[32] = 2.29000+5.70000/(1.00000+pow((STATES[0]+29.9700)/9.00000, 2.00000));
ALGEBRAIC[33] =  90.9699*(1.00000 - 1.00000/( (1.00000+exp((STATES[0]+13.9629)/45.3782))*(1.00000+exp(- (STATES[0]+9.49866)/3.39450))));
ALGEBRAIC[7] = 1.00000/(1.00000+exp(- (STATES[0]+54.2300)/9.88000));
ALGEBRAIC[34] = 0.450000+3.90000/(1.00000+pow((STATES[0]+66.0000)/26.0000, 2.00000));
ALGEBRAIC[8] = 0.0200000+0.980000/(1.00000+exp((STATES[0]+72.9780)/4.64000));
ALGEBRAIC[35] =  150.000*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 417.430)/203.180))*(1.00000+exp(- (STATES[0]+61.1100)/8.07000))));
ALGEBRAIC[9] = 1.00000/(1.00000+exp(- (STATES[0]+16.0000)/9.50000));
ALGEBRAIC[36] = 46.0999+1685.76/( (1.00000+exp(- (STATES[0]+40.8489)/13.7802))*(1.00000+exp((STATES[0]+20.6372)/15.1113)));
ALGEBRAIC[37] = 475.667+16321.6/( (1.00000+exp(- (STATES[0]+41.8328)/6.96673))*(1.00000+exp((STATES[0]+23.2432)/21.2949)));
ALGEBRAIC[10] = 1.00000/(1.00000+exp((STATES[0]+48.0000)/24.0000));
ALGEBRAIC[38] = 19.7864/(1.00000+pow((STATES[0]+20.7136)/44.2868, 2.00000)) - 0.378843;
ALGEBRAIC[11] = 1.00000/(1.00000+exp(- (STATES[0]+22.0000)/12.4800));
ALGEBRAIC[39] = 395.300/(1.00000+pow((STATES[0]+38.1000)/33.5900, 2.00000));
ALGEBRAIC[40] = (5503.00+5345.40/(1.00000+pow(10.0000,  (- 23.9000 - STATES[0])*- 0.0282700))) - 4590.60/(1.00000+pow(10.0000,  (STATES[0]+14.1500)*- 0.0357000));
ALGEBRAIC[12] = 0.490000+0.510000/(1.00000+exp((STATES[0]+1.08400)/28.7800));
ALGEBRAIC[41] = 5.44000+29.2000/(1.00000+pow((STATES[0]+48.0900)/48.8300, 2.00000));
ALGEBRAIC[14] = 1.00000/(1.00000+exp(- (STATES[0]+15.0400)/16.9500));
ALGEBRAIC[42] = 10.0000+895.900/(1.00000+exp((- 18.0100 - STATES[0])/31.0400));
ALGEBRAIC[15] = 0.405800/(1.00000+exp((STATES[0]+86.8400)/15.0500))+0.594200/(1.00000+exp((STATES[0] - 70.1300)/13.3700));
ALGEBRAIC[43] = 1077.00+185845./(1.00000+pow((STATES[0] - 39.4400)/7.34400, 2.00000));
ALGEBRAIC[44] = 37.5100+539.000/(1.00000+pow((STATES[0]+40.2400)/17.7200, 2.00000));
ALGEBRAIC[17] = 0.490000+0.510000/(1.00000+exp((STATES[0]+1.08400)/28.7800));
ALGEBRAIC[45] = 5.44000+29.2000/(1.00000+pow((STATES[0]+48.0900)/48.8300, 2.00000));
ALGEBRAIC[18] = 0.405800/(1.00000+exp((STATES[0]+86.8400)/15.0500))+0.594200/(1.00000+exp((STATES[0] - 70.1300)/13.3700));
ALGEBRAIC[46] = 1077.00+185845./(1.00000+pow((STATES[0] - 39.4400)/7.34400, 2.00000));
ALGEBRAIC[19] = 0.978613/(1.00000+exp(- (STATES[0]+18.6736)/26.6606));
ALGEBRAIC[47] = 500.000/(1.00000+pow((STATES[0]+60.7100)/15.7900, 2.00000));
ALGEBRAIC[20] = 1.00000/(1.00000+exp((STATES[0]+63.0000)/6.30000));
ALGEBRAIC[48] = 5000.00/(1.00000+pow((STATES[0]+62.7133)/35.8611, 2.00000));
ALGEBRAIC[49] = 30000.0+220000./(1.00000+exp((STATES[0]+22.0000)/4.00000));
ALGEBRAIC[21] = 0.948000/(1.00000+exp(- (STATES[0]+17.9100)/18.4000));
ALGEBRAIC[50] = 100.000/(1.00000+pow((STATES[0]+64.1000)/28.6700, 2.00000));
ALGEBRAIC[22] = 1.00000/(1.00000+exp((STATES[0]+21.2000)/5.70000));
ALGEBRAIC[51] =  1.00000e+06*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 315.000)/50.0000))*(1.00000+exp(- (STATES[0]+74.9000)/8.00000))));
ALGEBRAIC[52] =  2.50000e+06*(1.00000 - 1.00000/( (1.00000+exp((STATES[0] - 132.868)/25.3992))*(1.00000+exp(- (STATES[0]+24.9203)/2.67915))));
ALGEBRAIC[23] = 1.00000/(1.00000+exp(- (STATES[0]+27.7900)/7.57000));
ALGEBRAIC[53] = 17.0000/(1.00000+pow((STATES[0]+20.5232)/35.0000, 2.00000));
ALGEBRAIC[24] = 0.0200000+0.980000/(1.00000+exp((STATES[0]+69.5000)/6.00000));
ALGEBRAIC[54] = 7.50000+10.0000/(1.00000+pow((STATES[0]+34.1765)/120.000, 2.00000));
ALGEBRAIC[25] = - 0.749234/(1.00000+pow(( STATES[1]*CONSTANTS[6] - 0.0630535)/0.161942, 2.00000))+8.38384/(1.00000+pow(( STATES[1]*CONSTANTS[6]+1538.29)/739.057, 2.00000));
ALGEBRAIC[55] = 5011.47/(1.00000+pow(( STATES[1]*CONSTANTS[6]+0.237503)/0.000239278, 0.422910)) - 37.5137;
ALGEBRAIC[59] = 1.00000/(1.00000+exp(( - ALGEBRAIC[25]*CONSTANTS[72]*(STATES[0] - ALGEBRAIC[55]))/( CONSTANTS[71]*CONSTANTS[74])));
ALGEBRAIC[64] = 2.40914/(1.00000+pow((STATES[0] - 158.779)/- 52.1497, 2.00000));
ALGEBRAIC[26] = - 0.681249/(1.00000+pow(( STATES[1]*CONSTANTS[7] - 0.218988)/0.428335, 2.00000))+1.40001/(1.00000+pow(( STATES[1]*CONSTANTS[7]+228.710)/684.946, 2.00000));
ALGEBRAIC[56] = 8540.23/(1.00000+pow(( STATES[1]*CONSTANTS[7]+0.401189)/0.00399115, 0.668054)) - 109.275;
ALGEBRAIC[60] = 1.00000/(1.00000+exp(( - ALGEBRAIC[26]*CONSTANTS[72]*(STATES[0] - ALGEBRAIC[56]))/( CONSTANTS[71]*CONSTANTS[74])));
ALGEBRAIC[65] = 13.8049/(1.00000+pow((STATES[0] - 153.019)/66.4952, 2.00000));
ALGEBRAIC[27] = 1.00000/(1.00000+exp((STATES[0]+105.390)/8.65530));
ALGEBRAIC[57] =  3.50000e-06*exp( - 0.0497000*STATES[0]);
ALGEBRAIC[61] =  0.0400300*exp( 0.0521100*STATES[0]);
ALGEBRAIC[66] = 1.00000/(ALGEBRAIC[57]+ALGEBRAIC[61]);
ALGEBRAIC[28] = ( STATES[0]*CONSTANTS[72])/( CONSTANTS[71]*CONSTANTS[74]);
ALGEBRAIC[62] =  0.000600000*exp( 2.53000*ALGEBRAIC[28]);
ALGEBRAIC[67] =  0.100000*exp( - 5.00000*ALGEBRAIC[28]);
ALGEBRAIC[69] = 1.00000/(1.00000+ ALGEBRAIC[67]*(pow(ALGEBRAIC[62]/STATES[1], 2.00000)+ALGEBRAIC[62]/STATES[1]+1.00000));
ALGEBRAIC[71] = - 160.000+210.000/(1.00000+exp((STATES[0]+4.56000)/11.6200))+170.000/(1.00000+exp(- (STATES[0]+25.5000)/11.6200));
ALGEBRAIC[0] = (VOI>CONSTANTS[2]&&VOI<CONSTANTS[3] ? CONSTANTS[1] : CONSTANTS[0]);
ALGEBRAIC[63] =  CONSTANTS[16]*STATES[3]*STATES[3]*STATES[3]*STATES[4]*(STATES[0] - CONSTANTS[77]);
ALGEBRAIC[68] = 1.00000/(1.00000+pow(STATES[1]/CONSTANTS[19], 4.00000));
ALGEBRAIC[70] =  CONSTANTS[17]*ALGEBRAIC[68]*STATES[5]*STATES[5]*( 0.800000*STATES[6]+ 0.200000*STATES[7])*(STATES[0] - CONSTANTS[18]);
ALGEBRAIC[72] =  CONSTANTS[20]*STATES[8]*STATES[8]*STATES[9]*(STATES[0] - CONSTANTS[21]);
ALGEBRAIC[73] =  CONSTANTS[23]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[74] =  CONSTANTS[32]*( 0.800000*STATES[10]+ 0.200000*STATES[11])*STATES[12]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[75] =  CONSTANTS[29]*( 0.300000*STATES[13]+ 0.700000*STATES[14])*STATES[15]*STATES[16]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[76] =  CONSTANTS[30]*STATES[17]*STATES[18]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[77] =  CONSTANTS[31]*( 0.200000*STATES[19]+ 0.800000*STATES[20])*STATES[21]*STATES[22]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[78] =  CONSTANTS[24]*STATES[23]*STATES[23]*( 0.380000*STATES[24]+ 0.630000*STATES[25])*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[79] =  CONSTANTS[25]*STATES[26]*STATES[26]*( 0.750000*STATES[27]+ 0.250000*STATES[28])*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[80] =  CONSTANTS[28]*STATES[29]*STATES[30]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[81] =  CONSTANTS[22]*CONSTANTS[26]*STATES[31]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[82] =  CONSTANTS[22]*CONSTANTS[27]*STATES[32]*(STATES[0] - CONSTANTS[78]);
ALGEBRAIC[83] =  CONSTANTS[34]*STATES[33]*(STATES[0] - CONSTANTS[83]);
ALGEBRAIC[84] =  CONSTANTS[33]*STATES[34]*(STATES[0] - CONSTANTS[79]);
ALGEBRAIC[58] =  (( CONSTANTS[71]*CONSTANTS[74])/CONSTANTS[72])*log(( CONSTANTS[36]*CONSTANTS[63]+ CONSTANTS[37]*CONSTANTS[64]+( 4.00000*CONSTANTS[38]*CONSTANTS[12])/(1.00000+exp(ALGEBRAIC[28])))/( CONSTANTS[36]*CONSTANTS[11]+ CONSTANTS[37]*CONSTANTS[59]+( 4.00000*CONSTANTS[38]*STATES[1])/(1.00000+exp(ALGEBRAIC[28]))));
ALGEBRAIC[88] =  CONSTANTS[60]*CONSTANTS[67]*CONSTANTS[41]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[85] =  CONSTANTS[60]*CONSTANTS[61]*CONSTANTS[40]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[90] =  CONSTANTS[60]*CONSTANTS[65]*CONSTANTS[42]*CONSTANTS[35]*(STATES[0] - ALGEBRAIC[58]);
ALGEBRAIC[91] = 1.00000/(1.00000+ 0.124500*exp( - 0.100000*ALGEBRAIC[28])+ 0.00219000*exp(CONSTANTS[64]/49.7100)*exp( - 1.90000*ALGEBRAIC[28]));
ALGEBRAIC[92] =  CONSTANTS[75]*CONSTANTS[87]*CONSTANTS[88]*ALGEBRAIC[91];
ALGEBRAIC[95] = 1.00000/(1.00000+pow(CONSTANTS[47]/STATES[1], CONSTANTS[48]));
ALGEBRAIC[93] = exp( (CONSTANTS[86] - 1.00000)*ALGEBRAIC[28]);
ALGEBRAIC[94] = exp( CONSTANTS[86]*ALGEBRAIC[28]);
ALGEBRAIC[96] =  pow(CONSTANTS[59], 3.00000)*CONSTANTS[12]*ALGEBRAIC[94] -  pow(CONSTANTS[64], 3.00000)*STATES[1]*ALGEBRAIC[93];
ALGEBRAIC[97] = 1.00000+ CONSTANTS[85]*ALGEBRAIC[93];
ALGEBRAIC[98] =  CONSTANTS[52]*pow(CONSTANTS[59], 3.00000)+ pow(CONSTANTS[51], 3.00000)*STATES[1]+ pow(CONSTANTS[49], 3.00000)*CONSTANTS[12]*(1.00000+STATES[1]/CONSTANTS[50]);
ALGEBRAIC[99] =  CONSTANTS[12]*pow(CONSTANTS[59], 3.00000)+ pow(CONSTANTS[64], 3.00000)*STATES[1]+ pow(CONSTANTS[64], 3.00000)*CONSTANTS[50]*(1.00000+pow(CONSTANTS[59]/CONSTANTS[49], 3.00000));
ALGEBRAIC[100] = ( CONSTANTS[10]*CONSTANTS[84]*ALGEBRAIC[95]*ALGEBRAIC[96])/( ALGEBRAIC[97]*(ALGEBRAIC[98]+ALGEBRAIC[99]));
ALGEBRAIC[101] =  (( 0.500000*CONSTANTS[70]*CONSTANTS[72])/( CONSTANTS[69]*CONSTANTS[73]*CONSTANTS[68]))*CONSTANTS[9]*ALGEBRAIC[100];
ALGEBRAIC[104] = ALGEBRAIC[63]+ALGEBRAIC[83]+ALGEBRAIC[101]+ALGEBRAIC[92]+ALGEBRAIC[70]+ALGEBRAIC[72]+ALGEBRAIC[84]+ALGEBRAIC[74]+ALGEBRAIC[75]+ALGEBRAIC[76]+ALGEBRAIC[77]+ALGEBRAIC[78]+ALGEBRAIC[79]+ALGEBRAIC[80]+ALGEBRAIC[81]+ALGEBRAIC[82]+ALGEBRAIC[88]+ALGEBRAIC[90]+ALGEBRAIC[85]+ALGEBRAIC[73];
ALGEBRAIC[86] = ALGEBRAIC[70]+ALGEBRAIC[72]+ALGEBRAIC[85];
ALGEBRAIC[87] =  (( CONSTANTS[69]*CONSTANTS[73]*CONSTANTS[68])/( CONSTANTS[70]*CONSTANTS[72]))*ALGEBRAIC[86];
ALGEBRAIC[102] = CONSTANTS[44]/(1.00000+pow(CONSTANTS[45]/STATES[1], CONSTANTS[46]));
ALGEBRAIC[105] = ALGEBRAIC[87]+ALGEBRAIC[100]+ALGEBRAIC[102];
ALGEBRAIC[2] =  CONSTANTS[53]*(STATES[2] - 0.234500);
ALGEBRAIC[89] =  ALGEBRAIC[87]*CONSTANTS[4];
ALGEBRAIC[103] =  ALGEBRAIC[100]*CONSTANTS[4];
ALGEBRAIC[106] =  ALGEBRAIC[102]*CONSTANTS[4];
}