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 72 entries in the algebraic variable array.
There are a total of 43 entries in each of the rate and state variable arrays.
There are a total of 97 entries in the constant variable array.
*/
/*
* VOI is time in component environment (second).
* STATES[0] is V in component membrane (millivolt).
* CONSTANTS[0] is R in component membrane (joule_per_mole_kelvin).
* CONSTANTS[1] is T in component membrane (kelvin).
* CONSTANTS[2] is F in component membrane (coulomb_per_millimole).
* CONSTANTS[3] is C_sc in component membrane (microF_per_cm2).
* ALGEBRAIC[9] is i_Stim in component membrane (microA_per_microF).
* ALGEBRAIC[23] is i_Na in component fast_sodium_current (microA_per_microF).
* ALGEBRAIC[47] is i_Ca in component L_type_Ca_current (microA_per_microF).
* ALGEBRAIC[50] is i_Ca_K in component L_type_Ca_current (microA_per_microF).
* ALGEBRAIC[29] is i_Kr in component rapid_activating_delayed_rectifiyer_K_current (microA_per_microF).
* ALGEBRAIC[31] is i_Ks in component slow_activating_delayed_rectifiyer_K_current (microA_per_microF).
* ALGEBRAIC[32] is i_to1 in component transient_outward_potassium_current (microA_per_microF).
* ALGEBRAIC[34] is i_K1 in component time_independent_potassium_current (microA_per_microF).
* ALGEBRAIC[36] is i_Kp in component plateau_potassium_current (microA_per_microF).
* ALGEBRAIC[37] is i_NaCa in component Na_Ca_exchanger (microA_per_microF).
* ALGEBRAIC[40] is i_NaK in component sodium_potassium_pump (microA_per_microF).
* ALGEBRAIC[42] is i_p_Ca in component sarcolemmal_calcium_pump (microA_per_microF).
* ALGEBRAIC[44] is i_Ca_b in component calcium_background_current (microA_per_microF).
* ALGEBRAIC[45] is i_Na_b in component sodium_background_current (microA_per_microF).
* CONSTANTS[4] is stim_start in component membrane (second).
* CONSTANTS[5] is stim_end in component membrane (second).
* CONSTANTS[6] is stim_period in component membrane (second).
* CONSTANTS[7] is stim_duration in component membrane (second).
* CONSTANTS[8] is stim_amplitude in component membrane (microA_per_microF).
* ALGEBRAIC[19] is E_Na in component fast_sodium_current (millivolt).
* CONSTANTS[9] is g_Na in component fast_sodium_current (milliS_per_microF).
* CONSTANTS[10] is Na_o in component extracellular_ion_concentrations (millimolar).
* STATES[1] is Na_i in component intracellular_ion_concentrations (millimolar).
* STATES[2] is m in component fast_sodium_current_m_gate (dimensionless).
* STATES[3] is h in component fast_sodium_current_h_gate (dimensionless).
* STATES[4] is j in component fast_sodium_current_j_gate (dimensionless).
* ALGEBRAIC[10] is alpha_m in component fast_sodium_current_m_gate (per_second).
* ALGEBRAIC[20] is beta_m in component fast_sodium_current_m_gate (per_second).
* ALGEBRAIC[0] is E0_m in component fast_sodium_current_m_gate (millivolt).
* ALGEBRAIC[1] is alpha_h in component fast_sodium_current_h_gate (per_second).
* ALGEBRAIC[11] is beta_h in component fast_sodium_current_h_gate (per_second).
* ALGEBRAIC[2] is alpha_j in component fast_sodium_current_j_gate (per_second).
* ALGEBRAIC[12] is beta_j in component fast_sodium_current_j_gate (per_second).
* ALGEBRAIC[26] is E_K in component rapid_activating_delayed_rectifiyer_K_current (millivolt).
* CONSTANTS[11] is g_Kr in component rapid_activating_delayed_rectifiyer_K_current (milliS_per_microF).
* CONSTANTS[95] is f_K_o in component rapid_activating_delayed_rectifiyer_K_current (dimensionless).
* ALGEBRAIC[28] is R_V in component rapid_activating_delayed_rectifiyer_K_current (dimensionless).
* CONSTANTS[12] is K_o in component extracellular_ion_concentrations (millimolar).
* STATES[5] is K_i in component intracellular_ion_concentrations (millimolar).
* STATES[6] is X_kr in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* ALGEBRAIC[3] is K12 in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* ALGEBRAIC[13] is K21 in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* ALGEBRAIC[21] is X_kr_inf in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* ALGEBRAIC[24] is tau_X_kr in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (second).
* CONSTANTS[13] is tau_factor in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* CONSTANTS[14] is g_Ks in component slow_activating_delayed_rectifiyer_K_current (milliS_per_microF).
* ALGEBRAIC[30] is E_Ks in component slow_activating_delayed_rectifiyer_K_current (millivolt).
* STATES[7] is X_ks in component slow_activating_delayed_rectifiyer_K_current_X_ks_gate (dimensionless).
* ALGEBRAIC[14] is tau_X_ks in component slow_activating_delayed_rectifiyer_K_current_X_ks_gate (second).
* ALGEBRAIC[4] is X_ks_infinity in component slow_activating_delayed_rectifiyer_K_current_X_ks_gate (dimensionless).
* CONSTANTS[15] is g_to1 in component transient_outward_potassium_current (milliS_per_microF).
* STATES[8] is X_to1 in component transient_outward_potassium_current_X_to1_gate (dimensionless).
* STATES[9] is Y_to1 in component transient_outward_potassium_current_Y_to1_gate (dimensionless).
* ALGEBRAIC[5] is alpha_X_to1 in component transient_outward_potassium_current_X_to1_gate (per_second).
* ALGEBRAIC[15] is beta_X_to1 in component transient_outward_potassium_current_X_to1_gate (per_second).
* ALGEBRAIC[6] is alpha_Y_to1 in component transient_outward_potassium_current_Y_to1_gate (per_second).
* ALGEBRAIC[16] is beta_Y_to1 in component transient_outward_potassium_current_Y_to1_gate (per_second).
* CONSTANTS[16] is g_K1 in component time_independent_potassium_current (milliS_per_microF).
* CONSTANTS[17] is K_mK1 in component time_independent_potassium_current (millimolar).
* ALGEBRAIC[33] is K1_infinity_V in component time_independent_potassium_current_K1_gate (dimensionless).
* CONSTANTS[18] is g_Kp in component plateau_potassium_current (milliS_per_microF).
* ALGEBRAIC[35] is Kp_V in component plateau_potassium_current_Kp_gate (dimensionless).
* CONSTANTS[19] is K_mCa in component Na_Ca_exchanger (millimolar).
* CONSTANTS[20] is K_mNa in component Na_Ca_exchanger (millimolar).
* CONSTANTS[21] is K_NaCa in component Na_Ca_exchanger (microA_per_microF).
* CONSTANTS[22] is K_sat in component Na_Ca_exchanger (dimensionless).
* CONSTANTS[23] is eta in component Na_Ca_exchanger (dimensionless).
* STATES[10] is Ca_i in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[24] is Ca_o in component extracellular_ion_concentrations (millimolar).
* ALGEBRAIC[39] is i_NaK_winslow in component sodium_potassium_pump (microA_per_microF).
* CONSTANTS[25] is I_NaK in component sodium_potassium_pump (microA_per_microF).
* ALGEBRAIC[38] is f_NaK in component sodium_potassium_pump (dimensionless).
* CONSTANTS[26] is K_mNa_i in component sodium_potassium_pump (millimolar).
* CONSTANTS[27] is K_mK_o in component sodium_potassium_pump (millimolar).
* CONSTANTS[96] is sigma in component sodium_potassium_pump (dimensionless).
* STATES[11] is MgATP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* CONSTANTS[28] is MgATP_i0 in component Ca_and_Mg_buffering_by_ATP (millimolar).
* ALGEBRAIC[41] is i_p_Ca_winslow in component sarcolemmal_calcium_pump (microA_per_microF).
* CONSTANTS[29] is K_mpCa in component sarcolemmal_calcium_pump (millimolar).
* CONSTANTS[30] is I_pCa in component sarcolemmal_calcium_pump (microA_per_microF).
* CONSTANTS[31] is g_Cab in component calcium_background_current (milliS_per_microF).
* ALGEBRAIC[43] is E_Ca in component calcium_background_current (millivolt).
* CONSTANTS[32] is g_Nab in component sodium_background_current (milliS_per_microF).
* CONSTANTS[33] is P_Ca in component L_type_Ca_current (cm_per_second).
* CONSTANTS[34] is P_K in component L_type_Ca_current (cm_per_second).
* ALGEBRAIC[48] is p_prime_k in component L_type_Ca_current (cm_per_second).
* CONSTANTS[35] is i_Ca_half in component L_type_Ca_current (microA_per_microF).
* ALGEBRAIC[46] is i_Ca_max in component L_type_Ca_current (microA_per_microF).
* STATES[12] is O in component L_type_Ca_current (dimensionless).
* STATES[13] is O_Ca in component L_type_Ca_current (dimensionless).
* ALGEBRAIC[7] is alpha in component L_type_Ca_current (per_second).
* ALGEBRAIC[17] is beta in component L_type_Ca_current (per_second).
* ALGEBRAIC[27] is gamma in component L_type_Ca_current (per_second).
* ALGEBRAIC[22] is alpha_a in component L_type_Ca_current (per_second).
* ALGEBRAIC[25] is beta_b in component L_type_Ca_current (per_second).
* CONSTANTS[36] is a in component L_type_Ca_current (dimensionless).
* CONSTANTS[37] is b in component L_type_Ca_current (dimensionless).
* CONSTANTS[38] is g in component L_type_Ca_current (per_second).
* CONSTANTS[39] is f in component L_type_Ca_current (per_second).
* CONSTANTS[40] is gprime in component L_type_Ca_current (per_second).
* CONSTANTS[41] is fprime in component L_type_Ca_current (per_second).
* CONSTANTS[42] is omega in component L_type_Ca_current (per_second).
* STATES[14] is C0 in component L_type_Ca_current (dimensionless).
* STATES[15] is C1 in component L_type_Ca_current (dimensionless).
* STATES[16] is C2 in component L_type_Ca_current (dimensionless).
* STATES[17] is C3 in component L_type_Ca_current (dimensionless).
* STATES[18] is C4 in component L_type_Ca_current (dimensionless).
* STATES[19] is C_Ca0 in component L_type_Ca_current (dimensionless).
* STATES[20] is C_Ca1 in component L_type_Ca_current (dimensionless).
* STATES[21] is C_Ca2 in component L_type_Ca_current (dimensionless).
* STATES[22] is C_Ca3 in component L_type_Ca_current (dimensionless).
* STATES[23] is C_Ca4 in component L_type_Ca_current (dimensionless).
* STATES[24] is Ca_ss in component intracellular_ion_concentrations (millimolar).
* STATES[25] is y in component L_type_Ca_current_y_gate (dimensionless).
* ALGEBRAIC[8] is y_infinity in component L_type_Ca_current_y_gate (dimensionless).
* ALGEBRAIC[18] is tau_y in component L_type_Ca_current_y_gate (second).
* ALGEBRAIC[49] is J_rel in component RyR_channel (millimolar_per_second).
* CONSTANTS[43] is v1 in component RyR_channel (per_second).
* CONSTANTS[44] is k_a_plus in component RyR_channel (millimolar4_per_second).
* CONSTANTS[45] is k_a_minus in component RyR_channel (per_second).
* CONSTANTS[46] is k_b_plus in component RyR_channel (millimolar3_per_second).
* CONSTANTS[47] is k_b_minus in component RyR_channel (per_second).
* CONSTANTS[48] is k_c_plus in component RyR_channel (per_second).
* CONSTANTS[49] is k_c_minus in component RyR_channel (per_second).
* STATES[26] is P_O1 in component RyR_channel (dimensionless).
* STATES[27] is P_O2 in component RyR_channel (dimensionless).
* STATES[28] is P_C1 in component RyR_channel (dimensionless).
* STATES[29] is P_C2 in component RyR_channel (dimensionless).
* CONSTANTS[50] is n in component RyR_channel (dimensionless).
* CONSTANTS[51] is m in component RyR_channel (dimensionless).
* STATES[30] is Ca_JSR in component intracellular_ion_concentrations (millimolar).
* ALGEBRAIC[54] is J_up in component SERCA2a_pump (millimolar_per_second).
* ALGEBRAIC[53] is J_up_winslow in component SERCA2a_pump (millimolar_per_second).
* CONSTANTS[52] is K_fb in component SERCA2a_pump (millimolar).
* CONSTANTS[53] is K_rb in component SERCA2a_pump (millimolar).
* ALGEBRAIC[51] is fb in component SERCA2a_pump (dimensionless).
* ALGEBRAIC[52] is rb in component SERCA2a_pump (dimensionless).
* CONSTANTS[54] is Vmaxf in component SERCA2a_pump (millimolar_per_second).
* CONSTANTS[55] is Vmaxr in component SERCA2a_pump (millimolar_per_second).
* CONSTANTS[56] is K_SR in component SERCA2a_pump (dimensionless).
* CONSTANTS[57] is N_fb in component SERCA2a_pump (dimensionless).
* CONSTANTS[58] is N_rb in component SERCA2a_pump (dimensionless).
* STATES[31] is Ca_NSR in component intracellular_ion_concentrations (millimolar).
* ALGEBRAIC[56] is J_tr in component intracellular_Ca_fluxes (millimolar_per_second).
* ALGEBRAIC[55] is J_xfer in component intracellular_Ca_fluxes (millimolar_per_second).
* ALGEBRAIC[60] is J_trpn in component intracellular_Ca_fluxes (millimolar_per_second).
* CONSTANTS[59] is tau_tr in component intracellular_Ca_fluxes (second).
* CONSTANTS[60] is tau_xfer in component intracellular_Ca_fluxes (second).
* STATES[32] is HTRPNCa in component intracellular_Ca_fluxes (millimolar).
* STATES[33] is LTRPNCa in component intracellular_Ca_fluxes (millimolar).
* ALGEBRAIC[58] is J_HTRPNCa in component intracellular_Ca_fluxes (millimolar_per_second).
* ALGEBRAIC[59] is J_LTRPNCa in component intracellular_Ca_fluxes (millimolar_per_second).
* CONSTANTS[61] is HTRPN_tot in component intracellular_Ca_fluxes (dimensionless).
* CONSTANTS[62] is LTRPN_tot in component intracellular_Ca_fluxes (dimensionless).
* CONSTANTS[63] is k_htrpn_plus in component intracellular_Ca_fluxes (per_millimolar_second).
* CONSTANTS[64] is k_htrpn_minus in component intracellular_Ca_fluxes (per_second).
* CONSTANTS[65] is k_ltrpn_plus in component intracellular_Ca_fluxes (per_millimolar_second).
* CONSTANTS[66] is k_ltrpn_minus in component intracellular_Ca_fluxes (per_second).
* CONSTANTS[67] is A_cap in component intracellular_ion_concentrations (cm2).
* CONSTANTS[68] is V_myo in component intracellular_ion_concentrations (microlitre).
* CONSTANTS[69] is V_JSR in component intracellular_ion_concentrations (microlitre).
* CONSTANTS[70] is V_NSR in component intracellular_ion_concentrations (microlitre).
* CONSTANTS[71] is V_ss in component intracellular_ion_concentrations (microlitre).
* CONSTANTS[72] is K_mCMDN in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[73] is K_mEGTA in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[74] is K_mCSQN in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[75] is CMDN_tot in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[76] is EGTA_tot in component intracellular_ion_concentrations (millimolar).
* CONSTANTS[77] is CSQN_tot in component intracellular_ion_concentrations (millimolar).
* ALGEBRAIC[61] is beta_i in component intracellular_ion_concentrations (dimensionless).
* ALGEBRAIC[62] is beta_SS in component intracellular_ion_concentrations (dimensionless).
* ALGEBRAIC[57] is beta_JSR in component intracellular_ion_concentrations (dimensionless).
* CONSTANTS[78] is k_plus_CaATP in component Ca_and_Mg_buffering_by_ATP (per_millimolar_second).
* CONSTANTS[79] is k_minus_CaATP in component Ca_and_Mg_buffering_by_ATP (per_second).
* CONSTANTS[80] is k_plus_CaADP in component Ca_and_Mg_buffering_by_ATP (per_millimolar_second).
* CONSTANTS[81] is k_minus_CaADP in component Ca_and_Mg_buffering_by_ATP (per_second).
* STATES[34] is CaADP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[35] is CaADP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[36] is CaATP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* ALGEBRAIC[64] is ATP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* ALGEBRAIC[68] is ADP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* ALGEBRAIC[65] is ADP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* ALGEBRAIC[63] is ATP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[37] is CaATP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[38] is Mg_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[39] is Mg_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[40] is MgADP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[41] is MgADP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* STATES[42] is MgATP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* CONSTANTS[82] is ATP_tot in component Ca_and_Mg_buffering_by_ATP (millimolar).
* CONSTANTS[83] is k_plus_MgATP in component Ca_and_Mg_buffering_by_ATP (per_millimolar_second).
* CONSTANTS[84] is k_minus_MgATP in component Ca_and_Mg_buffering_by_ATP (per_second).
* ALGEBRAIC[66] is Jxfer_CaATP in component Ca_and_Mg_buffering_by_ATP (millimolar_per_second).
* ALGEBRAIC[67] is Jxfer_MgATP in component Ca_and_Mg_buffering_by_ATP (millimolar_per_second).
* ALGEBRAIC[69] is Jxfer_Mg in component Ca_and_Mg_buffering_by_ATP (millimolar_per_second).
* CONSTANTS[85] is tau_xfer_CaATP in component Ca_and_Mg_buffering_by_ATP (second).
* CONSTANTS[86] is tau_xfer_MgATP in component Ca_and_Mg_buffering_by_ATP (second).
* CONSTANTS[87] is tau_xfer_Mg in component Ca_and_Mg_buffering_by_ATP (second).
* CONSTANTS[88] is ADP_tot in component Ca_and_Mg_buffering_by_ATP (millimolar).
* CONSTANTS[89] is k_plus_MgADP in component Ca_and_Mg_buffering_by_ATP (per_millimolar_second).
* CONSTANTS[90] is k_minus_MgADP in component Ca_and_Mg_buffering_by_ATP (per_second).
* ALGEBRAIC[70] is Jxfer_CaADP in component Ca_and_Mg_buffering_by_ATP (millimolar_per_second).
* ALGEBRAIC[71] is Jxfer_MgADP in component Ca_and_Mg_buffering_by_ATP (millimolar_per_second).
* CONSTANTS[91] is tau_xfer_CaADP in component Ca_and_Mg_buffering_by_ATP (second).
* CONSTANTS[92] is tau_xfer_MgADP in component Ca_and_Mg_buffering_by_ATP (second).
* CONSTANTS[93] is V_myo in component model_parameters (microlitre).
* CONSTANTS[94] is V_ss in component model_parameters (microlitre).
* RATES[0] is d/dt V in component membrane (millivolt).
* RATES[2] is d/dt m in component fast_sodium_current_m_gate (dimensionless).
* RATES[3] is d/dt h in component fast_sodium_current_h_gate (dimensionless).
* RATES[4] is d/dt j in component fast_sodium_current_j_gate (dimensionless).
* RATES[6] is d/dt X_kr in component rapid_activating_delayed_rectifiyer_K_current_X_kr_gate (dimensionless).
* RATES[7] is d/dt X_ks in component slow_activating_delayed_rectifiyer_K_current_X_ks_gate (dimensionless).
* RATES[8] is d/dt X_to1 in component transient_outward_potassium_current_X_to1_gate (dimensionless).
* RATES[9] is d/dt Y_to1 in component transient_outward_potassium_current_Y_to1_gate (dimensionless).
* RATES[14] is d/dt C0 in component L_type_Ca_current (dimensionless).
* RATES[15] is d/dt C1 in component L_type_Ca_current (dimensionless).
* RATES[16] is d/dt C2 in component L_type_Ca_current (dimensionless).
* RATES[17] is d/dt C3 in component L_type_Ca_current (dimensionless).
* RATES[18] is d/dt C4 in component L_type_Ca_current (dimensionless).
* RATES[12] is d/dt O in component L_type_Ca_current (dimensionless).
* RATES[19] is d/dt C_Ca0 in component L_type_Ca_current (dimensionless).
* RATES[20] is d/dt C_Ca1 in component L_type_Ca_current (dimensionless).
* RATES[21] is d/dt C_Ca2 in component L_type_Ca_current (dimensionless).
* RATES[22] is d/dt C_Ca3 in component L_type_Ca_current (dimensionless).
* RATES[23] is d/dt C_Ca4 in component L_type_Ca_current (dimensionless).
* RATES[13] is d/dt O_Ca in component L_type_Ca_current (dimensionless).
* RATES[25] is d/dt y in component L_type_Ca_current_y_gate (dimensionless).
* RATES[28] is d/dt P_C1 in component RyR_channel (dimensionless).
* RATES[26] is d/dt P_O1 in component RyR_channel (dimensionless).
* RATES[27] is d/dt P_O2 in component RyR_channel (dimensionless).
* RATES[29] is d/dt P_C2 in component RyR_channel (dimensionless).
* RATES[32] is d/dt HTRPNCa in component intracellular_Ca_fluxes (millimolar).
* RATES[33] is d/dt LTRPNCa in component intracellular_Ca_fluxes (millimolar).
* RATES[10] is d/dt Ca_i in component intracellular_ion_concentrations (millimolar).
* RATES[1] is d/dt Na_i in component intracellular_ion_concentrations (millimolar).
* RATES[5] is d/dt K_i in component intracellular_ion_concentrations (millimolar).
* RATES[24] is d/dt Ca_ss in component intracellular_ion_concentrations (millimolar).
* RATES[30] is d/dt Ca_JSR in component intracellular_ion_concentrations (millimolar).
* RATES[31] is d/dt Ca_NSR in component intracellular_ion_concentrations (millimolar).
* RATES[36] is d/dt CaATP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[42] is d/dt MgATP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[37] is d/dt CaATP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[11] is d/dt MgATP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[35] is d/dt CaADP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[41] is d/dt MgADP_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[34] is d/dt CaADP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[40] is d/dt MgADP_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[38] is d/dt Mg_ss in component Ca_and_Mg_buffering_by_ATP (millimolar).
* RATES[39] is d/dt Mg_i in component Ca_and_Mg_buffering_by_ATP (millimolar).
*/
void
initConsts(double* CONSTANTS, double* RATES, double *STATES)
{
STATES[0] = -96.1638;
CONSTANTS[0] = 8.314472;
CONSTANTS[1] = 310;
CONSTANTS[2] = 96.4853415;
CONSTANTS[3] = 0.001;
CONSTANTS[4] = 0.1;
CONSTANTS[5] = 100000000;
CONSTANTS[6] = 1;
CONSTANTS[7] = 0.0005;
CONSTANTS[8] = -100.0;
CONSTANTS[9] = 12.8;
CONSTANTS[10] = 138;
STATES[1] = 10;
STATES[2] = 0.0328302;
STATES[3] = 0.988354;
STATES[4] = 0.99254;
CONSTANTS[11] = 0.0034;
CONSTANTS[12] = 4;
STATES[5] = 159.48;
STATES[6] = 0.51;
CONSTANTS[13] = 1;
CONSTANTS[14] = 0.0027134;
STATES[7] = 0.264;
CONSTANTS[15] = 0.23815;
STATES[8] = 2.63;
STATES[9] = 0.99;
CONSTANTS[16] = 2.8;
CONSTANTS[17] = 13;
CONSTANTS[18] = 0.002216;
CONSTANTS[19] = 1.38;
CONSTANTS[20] = 87.5;
CONSTANTS[21] = 0.3;
CONSTANTS[22] = 0.2;
CONSTANTS[23] = 0.35;
STATES[10] = 8.464E-5;
CONSTANTS[24] = 2;
CONSTANTS[25] = 0.693;
CONSTANTS[26] = 10;
CONSTANTS[27] = 1.5;
STATES[11] = 6.4395;
CONSTANTS[28] = 2.888;
CONSTANTS[29] = 0.00005;
CONSTANTS[30] = 0.05;
CONSTANTS[31] = 0.0003842;
CONSTANTS[32] = 0.0031;
CONSTANTS[33] = 3.125e-4;
CONSTANTS[34] = 5.79e-7;
CONSTANTS[35] = -0.265;
STATES[12] = 9.84546e-21;
STATES[13] = 0;
CONSTANTS[36] = 2;
CONSTANTS[37] = 2;
CONSTANTS[38] = 2000;
CONSTANTS[39] = 300;
CONSTANTS[40] = 7000;
CONSTANTS[41] = 7;
CONSTANTS[42] = 10;
STATES[14] = 0.997208;
STATES[15] = 6.38897e-5;
STATES[16] = 1.535e-9;
STATES[17] = 1.63909e-14;
STATES[18] = 6.56337e-20;
STATES[19] = 0.00272826;
STATES[20] = 6.99215e-7;
STATES[21] = 6.71989e-11;
STATES[22] = 2.87031e-15;
STATES[23] = 4.59752e-20;
STATES[24] = 1.315E-4;
STATES[25] = 0.798;
CONSTANTS[43] = 1800;
CONSTANTS[44] = 1.215e13;
CONSTANTS[45] = 576;
CONSTANTS[46] = 4.05e9;
CONSTANTS[47] = 1930;
CONSTANTS[48] = 100;
CONSTANTS[49] = 0.8;
STATES[26] = 0;
STATES[27] = 0;
STATES[28] = 0.47;
STATES[29] = 0.53;
CONSTANTS[50] = 4;
CONSTANTS[51] = 3;
STATES[30] = 0.2616;
CONSTANTS[52] = 0.000168;
CONSTANTS[53] = 3.29;
CONSTANTS[54] = 0.0813;
CONSTANTS[55] = 0.318;
CONSTANTS[56] = 1;
CONSTANTS[57] = 1.2;
CONSTANTS[58] = 1;
STATES[31] = 0.2620;
CONSTANTS[59] = 0.0005747;
CONSTANTS[60] = 0.0267;
STATES[32] = 0.98;
STATES[33] = 0.078;
CONSTANTS[61] = 0.14;
CONSTANTS[62] = 0.07;
CONSTANTS[63] = 20000;
CONSTANTS[64] = 0.066;
CONSTANTS[65] = 40000;
CONSTANTS[66] = 40;
CONSTANTS[67] = 0.0001534;
CONSTANTS[68] = 0.00002584;
CONSTANTS[69] = 0.00000016;
CONSTANTS[70] = 0.0000021;
CONSTANTS[71] = 0.0000000012;
CONSTANTS[72] = 0.00238;
CONSTANTS[73] = 0.00015;
CONSTANTS[74] = 0.8;
CONSTANTS[75] = 0.05;
CONSTANTS[76] = 0;
CONSTANTS[77] = 15;
CONSTANTS[78] = 225000.0;
CONSTANTS[79] = 45000.0;
CONSTANTS[80] = 125000.0;
CONSTANTS[81] = 193500;
STATES[34] = 0.11E-6;
STATES[35] = 0.13E-6;
STATES[36] = 0.25E-3;
STATES[37] = 0.237E-3;
STATES[38] = 1.0;
STATES[39] = 1.0;
STATES[40] = 0.298E-2;
STATES[41] = 0.298E-2;
STATES[42] = 6.4395;
CONSTANTS[82] = 7.0;
CONSTANTS[83] = 125000.0;
CONSTANTS[84] = 10875.0;
CONSTANTS[85] = 0.0534;
CONSTANTS[86] = 0.0534;
CONSTANTS[87] = 0.0267;
CONSTANTS[88] = 0.005;
CONSTANTS[89] = 125000.0;
CONSTANTS[90] = 84500.0;
CONSTANTS[91] = 0.0534;
CONSTANTS[92] = 0.0534;
CONSTANTS[93] = 0.00002584;
CONSTANTS[94] = 0.0000000012;
CONSTANTS[95] = pow((CONSTANTS[12]/4.00000), 1.0 / 2);
CONSTANTS[96] = (1.00000/7.00000)*(exp(CONSTANTS[10]/67.3000) - 1.00000);
}
void
computeRates(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
RATES[12] = CONSTANTS[39]*STATES[18] - CONSTANTS[38]*STATES[12];
RATES[13] = CONSTANTS[41]*STATES[23] - CONSTANTS[40]*STATES[13];
RATES[28] = - CONSTANTS[44]*pow(STATES[24], CONSTANTS[50])*STATES[28]+ CONSTANTS[45]*STATES[26];
RATES[26] = ( CONSTANTS[44]*pow(STATES[24], CONSTANTS[50])*STATES[28] - ( CONSTANTS[45]*STATES[26]+ CONSTANTS[46]*pow(STATES[24], CONSTANTS[51])*STATES[26]+ CONSTANTS[48]*STATES[26]))+ CONSTANTS[47]*STATES[27]+ CONSTANTS[49]*STATES[29];
RATES[27] = CONSTANTS[46]*pow(STATES[24], CONSTANTS[51])*STATES[26] - CONSTANTS[47]*STATES[27];
RATES[29] = CONSTANTS[48]*STATES[26] - CONSTANTS[49]*STATES[29];
ALGEBRAIC[1] = (STATES[0]<- 40.0000 ? 135.000*exp((80.0000+STATES[0])/- 6.80000) : 0.00000);
ALGEBRAIC[11] = (STATES[0]<- 40.0000 ? 3560.00*exp( 0.0790000*STATES[0])+ 310000.*exp( 0.350000*STATES[0]) : 1000.00/( 0.130000*(1.00000+exp((STATES[0]+10.6600)/- 11.1000))));
RATES[3] = ALGEBRAIC[1]*(1.00000 - STATES[3]) - ALGEBRAIC[11]*STATES[3];
ALGEBRAIC[2] = (STATES[0]<- 40.0000 ? ( 1000.00*- ( 127140.*exp( 0.244400*STATES[0])+ 3.47400e-05*exp( - 0.0439100*STATES[0]))*(STATES[0]+37.7800))/(1.00000+exp( 0.311000*(STATES[0]+79.2300))) : 0.00000);
ALGEBRAIC[12] = (STATES[0]<- 40.0000 ? ( 121.200*exp( - 0.0105200*STATES[0]))/(1.00000+exp( - 0.137800*(STATES[0]+40.1400))) : ( 300.000*exp( - 2.53500e-07*STATES[0]))/(1.00000+exp( - 0.100000*(STATES[0]+32.0000))));
RATES[4] = ALGEBRAIC[2]*(1.00000 - STATES[4]) - ALGEBRAIC[12]*STATES[4];
ALGEBRAIC[14] = 0.00100000/(( 7.19000e-05*(STATES[0] - 10.0000))/(1.00000 - exp( - 0.148000*(STATES[0] - 10.0000)))+( 0.000131000*(STATES[0] - 10.0000))/(exp( 0.0687000*(STATES[0] - 10.0000)) - 1.00000));
ALGEBRAIC[4] = 1.00000/(1.00000+exp(- (STATES[0] - 24.7000)/13.6000));
RATES[7] = (ALGEBRAIC[4] - STATES[7])/ALGEBRAIC[14];
ALGEBRAIC[5] = 45.1600*exp( 0.0357700*STATES[0]);
ALGEBRAIC[15] = 98.9000*exp( - 0.0623700*STATES[0]);
RATES[8] = ALGEBRAIC[5]*(1.00000 - STATES[8]) - ALGEBRAIC[15]*STATES[8];
ALGEBRAIC[6] = ( 5.41500*exp(- (STATES[0]+33.5000)/5.00000))/(1.00000+ 0.0513350*exp(- (STATES[0]+33.5000)/5.00000));
ALGEBRAIC[16] = ( 5.41500*exp((STATES[0]+33.5000)/5.00000))/(1.00000+ 0.0513350*exp((STATES[0]+33.5000)/5.00000));
RATES[9] = ALGEBRAIC[6]*(1.00000 - STATES[9]) - ALGEBRAIC[16]*STATES[9];
ALGEBRAIC[8] = 0.800000/(1.00000+exp((STATES[0]+12.5000)/5.00000))+0.200000;
ALGEBRAIC[18] = (20.0000+600.000/(1.00000+exp((STATES[0]+20.0000)/9.50000)))/1000.00;
RATES[25] = (ALGEBRAIC[8] - STATES[25])/ALGEBRAIC[18];
ALGEBRAIC[0] = STATES[0]+47.1300;
ALGEBRAIC[10] = (fabs(ALGEBRAIC[0])<1.00000e-05 ? 320.000/(0.100000 - 0.00500000*ALGEBRAIC[0]) : ( 320.000*ALGEBRAIC[0])/(1.00000 - exp( - 0.100000*ALGEBRAIC[0])));
ALGEBRAIC[20] = 80.0000*exp(- STATES[0]/11.0000);
RATES[2] = (STATES[0]>=- 90.0000 ? ALGEBRAIC[10]*(1.00000 - STATES[2]) - ALGEBRAIC[20]*STATES[2] : 0.00000);
ALGEBRAIC[3] = exp(- 5.49500+ 0.169100*STATES[0]);
ALGEBRAIC[13] = exp(- 7.67700 - 0.0128000*STATES[0]);
ALGEBRAIC[21] = ALGEBRAIC[3]/(ALGEBRAIC[3]+ALGEBRAIC[13]);
ALGEBRAIC[24] = 0.00100000/(ALGEBRAIC[3]+ALGEBRAIC[13])+ CONSTANTS[13]*0.0270000;
RATES[6] = (ALGEBRAIC[21] - STATES[6])/ALGEBRAIC[24];
ALGEBRAIC[7] = 400.000*exp((STATES[0]+2.00000)/10.0000);
ALGEBRAIC[17] = 50.0000*exp(- (STATES[0]+2.00000)/13.0000);
ALGEBRAIC[27] = ( 103.750*STATES[24])/1.00000;
RATES[14] = ( ALGEBRAIC[17]*STATES[15]+ CONSTANTS[42]*STATES[19]) - ( 4.00000*ALGEBRAIC[7]+ALGEBRAIC[27])*STATES[14];
RATES[15] = ( 4.00000*ALGEBRAIC[7]*STATES[14]+ 2.00000*ALGEBRAIC[17]*STATES[16]+ (CONSTANTS[42]/CONSTANTS[37])*STATES[20]) - (ALGEBRAIC[17]+ 3.00000*ALGEBRAIC[7]+ ALGEBRAIC[27]*CONSTANTS[36])*STATES[15];
RATES[16] = ( 3.00000*ALGEBRAIC[7]*STATES[15]+ 3.00000*ALGEBRAIC[17]*STATES[17]+ (CONSTANTS[42]/pow(CONSTANTS[37], 2.00000))*STATES[21]) - ( ALGEBRAIC[17]*2.00000+ 2.00000*ALGEBRAIC[7]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 2.00000))*STATES[16];
RATES[17] = ( 2.00000*ALGEBRAIC[7]*STATES[16]+ 4.00000*ALGEBRAIC[17]*STATES[18]+ (CONSTANTS[42]/pow(CONSTANTS[37], 3.00000))*STATES[22]) - ( ALGEBRAIC[17]*3.00000+ALGEBRAIC[7]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 3.00000))*STATES[17];
RATES[18] = ( ALGEBRAIC[7]*STATES[17]+ CONSTANTS[38]*STATES[12]+ (CONSTANTS[42]/pow(CONSTANTS[37], 4.00000))*STATES[23]) - ( ALGEBRAIC[17]*4.00000+CONSTANTS[39]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 4.00000))*STATES[18];
ALGEBRAIC[22] = ALGEBRAIC[7]*CONSTANTS[36];
ALGEBRAIC[25] = ALGEBRAIC[17]/CONSTANTS[37];
RATES[19] = ( ALGEBRAIC[25]*STATES[20]+ ALGEBRAIC[27]*STATES[14]) - ( 4.00000*ALGEBRAIC[22]+CONSTANTS[42])*STATES[19];
RATES[20] = ( 4.00000*ALGEBRAIC[22]*STATES[19]+ 2.00000*ALGEBRAIC[25]*STATES[21]+ ALGEBRAIC[27]*CONSTANTS[36]*STATES[15]) - (ALGEBRAIC[25]+ 3.00000*ALGEBRAIC[22]+CONSTANTS[42]/CONSTANTS[37])*STATES[20];
RATES[21] = ( 3.00000*ALGEBRAIC[22]*STATES[20]+ 3.00000*ALGEBRAIC[25]*STATES[22]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 2.00000)*STATES[16]) - ( ALGEBRAIC[25]*2.00000+ 2.00000*ALGEBRAIC[22]+CONSTANTS[42]/pow(CONSTANTS[37], 2.00000))*STATES[21];
RATES[22] = ( 2.00000*ALGEBRAIC[22]*STATES[21]+ 4.00000*ALGEBRAIC[25]*STATES[23]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 3.00000)*STATES[17]) - ( ALGEBRAIC[25]*3.00000+ALGEBRAIC[22]+CONSTANTS[42]/pow(CONSTANTS[37], 3.00000))*STATES[22];
RATES[23] = ( ALGEBRAIC[22]*STATES[22]+ CONSTANTS[40]*STATES[13]+ ALGEBRAIC[27]*pow(CONSTANTS[36], 4.00000)*STATES[18]) - ( ALGEBRAIC[25]*4.00000+CONSTANTS[41]+CONSTANTS[42]/pow(CONSTANTS[37], 4.00000))*STATES[23];
ALGEBRAIC[19] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log(CONSTANTS[10]/STATES[1]);
ALGEBRAIC[23] = CONSTANTS[9]*pow(STATES[2], 3.00000)*STATES[3]*STATES[4]*(STATES[0] - ALGEBRAIC[19]);
ALGEBRAIC[37] = (( CONSTANTS[21]*5000.00)/( (pow(CONSTANTS[20], 3.00000)+pow(CONSTANTS[10], 3.00000))*(CONSTANTS[19]+CONSTANTS[24])*(1.00000+ CONSTANTS[22]*exp(( (CONSTANTS[23] - 1.00000)*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])))))*( exp(( CONSTANTS[23]*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*pow(STATES[1], 3.00000)*CONSTANTS[24] - exp(( (CONSTANTS[23] - 1.00000)*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*pow(CONSTANTS[10], 3.00000)*STATES[10]);
ALGEBRAIC[38] = 1.00000/(1.00000+ 0.124500*exp(( - 0.100000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))+ 0.0365000*CONSTANTS[96]*exp(( - STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])));
ALGEBRAIC[39] = ( (( CONSTANTS[25]*ALGEBRAIC[38])/(1.00000+pow(CONSTANTS[26]/STATES[1], 1.50000)))*CONSTANTS[12])/(CONSTANTS[12]+CONSTANTS[27]);
ALGEBRAIC[40] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[39];
ALGEBRAIC[45] = CONSTANTS[32]*(STATES[0] - ALGEBRAIC[19]);
RATES[1] = ( - 0.00000*(ALGEBRAIC[23]+ALGEBRAIC[45]+ ALGEBRAIC[37]*3.00000+ ALGEBRAIC[40]*3.00000)*CONSTANTS[67]*1.00000)/( CONSTANTS[68]*CONSTANTS[2]);
ALGEBRAIC[9] = (VOI>=CONSTANTS[4]&&VOI<=CONSTANTS[5]&&(VOI - CONSTANTS[4]) - floor((VOI - CONSTANTS[4])/CONSTANTS[6])*CONSTANTS[6]<=CONSTANTS[7] ? CONSTANTS[8] : 0.00000);
ALGEBRAIC[46] = ( (( (CONSTANTS[33]/( 1.00000*1.00000))*4.00000*STATES[0]*pow(CONSTANTS[2], 2.00000)*1000.00)/( CONSTANTS[0]*CONSTANTS[1]))*( 0.00100000*exp(( 2.00000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 0.341000*CONSTANTS[24]))/(exp(( 2.00000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 1.00000);
ALGEBRAIC[47] = ALGEBRAIC[46]*STATES[25]*(STATES[12]+STATES[13]);
ALGEBRAIC[48] = CONSTANTS[34]/(1.00000+ALGEBRAIC[46]/CONSTANTS[35]);
ALGEBRAIC[50] = ( (( (ALGEBRAIC[48]/( 1.00000*1.00000))*STATES[25]*(STATES[12]+STATES[13])*STATES[0]*pow(CONSTANTS[2], 2.00000))/( CONSTANTS[0]*CONSTANTS[1]))*( STATES[5]*exp(( STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - CONSTANTS[12]))/(exp(( STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 1.00000);
ALGEBRAIC[26] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log(CONSTANTS[12]/STATES[5]);
ALGEBRAIC[28] = 1.00000/(1.00000+ 1.49450*exp( 0.0446000*STATES[0]));
ALGEBRAIC[29] = CONSTANTS[11]*CONSTANTS[95]*ALGEBRAIC[28]*STATES[6]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[30] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log((CONSTANTS[12]+ 0.0183300*CONSTANTS[10])/(STATES[5]+ 0.0183300*STATES[1]));
ALGEBRAIC[31] = CONSTANTS[14]*pow(STATES[7], 2.00000)*(STATES[0] - ALGEBRAIC[30]);
ALGEBRAIC[32] = CONSTANTS[15]*STATES[8]*STATES[9]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[33] = 1.00000/(2.00000+exp( (( 1.50000*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*(STATES[0] - ALGEBRAIC[26])));
ALGEBRAIC[34] = (( CONSTANTS[16]*ALGEBRAIC[33]*CONSTANTS[12])/(CONSTANTS[12]+CONSTANTS[17]))*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[35] = 1.00000/(1.00000+exp((7.48800 - STATES[0])/5.98000));
ALGEBRAIC[36] = CONSTANTS[18]*ALGEBRAIC[35]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[41] = ( CONSTANTS[30]*STATES[10])/(CONSTANTS[29]+STATES[10]);
ALGEBRAIC[42] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[41];
ALGEBRAIC[43] = (( CONSTANTS[0]*CONSTANTS[1])/( 2.00000*CONSTANTS[2]))*log(CONSTANTS[24]/STATES[10]);
ALGEBRAIC[44] = CONSTANTS[31]*(STATES[0] - ALGEBRAIC[43]);
RATES[0] = ( - 1.00000*1.00000*(ALGEBRAIC[23]+ALGEBRAIC[47]+ALGEBRAIC[50]+ALGEBRAIC[29]+ALGEBRAIC[31]+ALGEBRAIC[32]+ALGEBRAIC[34]+ALGEBRAIC[36]+ALGEBRAIC[37]+ALGEBRAIC[40]+ALGEBRAIC[42]+ALGEBRAIC[45]+ALGEBRAIC[44]+ALGEBRAIC[9]))/CONSTANTS[3];
RATES[5] = ( - 0.00000*(ALGEBRAIC[50]+ALGEBRAIC[29]+ALGEBRAIC[31]+ALGEBRAIC[34]+ALGEBRAIC[36]+ALGEBRAIC[32]+ ALGEBRAIC[40]*- 2.00000)*CONSTANTS[67]*1.00000)/( CONSTANTS[68]*CONSTANTS[2]);
RATES[32] = CONSTANTS[63]*STATES[10]*(1.00000 - STATES[32]) - CONSTANTS[64]*STATES[32];
ALGEBRAIC[51] = pow(STATES[10]/CONSTANTS[52], CONSTANTS[57]);
ALGEBRAIC[52] = pow(STATES[31]/CONSTANTS[53], CONSTANTS[58]);
ALGEBRAIC[53] = ( CONSTANTS[56]*( CONSTANTS[54]*ALGEBRAIC[51] - CONSTANTS[55]*ALGEBRAIC[52]))/(1.00000+ALGEBRAIC[51]+ALGEBRAIC[52]);
ALGEBRAIC[54] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[53];
ALGEBRAIC[56] = (STATES[31] - STATES[30])/CONSTANTS[59];
RATES[31] = ( ALGEBRAIC[54]*CONSTANTS[68])/CONSTANTS[70] - ( ALGEBRAIC[56]*CONSTANTS[69])/CONSTANTS[70];
ALGEBRAIC[49] = CONSTANTS[43]*(STATES[26]+STATES[27])*(STATES[30] - STATES[24]);
ALGEBRAIC[57] = 1.00000/(1.00000+( CONSTANTS[77]*CONSTANTS[74])/pow(CONSTANTS[74]+STATES[30], 2.00000));
RATES[30] = ALGEBRAIC[57]*(ALGEBRAIC[56] - ALGEBRAIC[49]);
RATES[33] = CONSTANTS[65]*STATES[10]*(1.00000 - STATES[33]) - CONSTANTS[66]*STATES[33];
ALGEBRAIC[55] = (STATES[24] - STATES[10])/CONSTANTS[60];
ALGEBRAIC[62] = 1.00000/(1.00000+( CONSTANTS[75]*CONSTANTS[72])/pow(CONSTANTS[72]+STATES[24], 2.00000)+( CONSTANTS[76]*CONSTANTS[73])/pow(CONSTANTS[73]+STATES[24], 2.00000));
ALGEBRAIC[65] = CONSTANTS[88] - (STATES[35]+STATES[41]);
ALGEBRAIC[63] = CONSTANTS[82] - (STATES[36]+STATES[42]);
RATES[24] = ALGEBRAIC[62]*((( ALGEBRAIC[49]*CONSTANTS[69])/CONSTANTS[71]+ CONSTANTS[79]*STATES[36]+ CONSTANTS[81]*STATES[35]) - (( ALGEBRAIC[55]*CONSTANTS[68])/CONSTANTS[71]+ ALGEBRAIC[47]*(( CONSTANTS[67]*1.00000)/( 2.00000*CONSTANTS[71]*CONSTANTS[2]))+ CONSTANTS[78]*STATES[24]*ALGEBRAIC[63]+ CONSTANTS[80]*STATES[24]*ALGEBRAIC[65]));
ALGEBRAIC[66] = (STATES[36] - STATES[37])/CONSTANTS[85];
RATES[36] = CONSTANTS[78]*STATES[24]*ALGEBRAIC[63] - ( ALGEBRAIC[66]*(CONSTANTS[93]/CONSTANTS[94])+ CONSTANTS[79]*STATES[36]);
ALGEBRAIC[67] = (STATES[42] - STATES[11])/CONSTANTS[86];
RATES[42] = CONSTANTS[83]*STATES[38]*ALGEBRAIC[63] - ( ALGEBRAIC[67]*(CONSTANTS[93]/CONSTANTS[94])+ CONSTANTS[84]*STATES[42]);
ALGEBRAIC[64] = CONSTANTS[82] - (STATES[37]+STATES[11]);
RATES[37] = (ALGEBRAIC[66]+ CONSTANTS[78]*STATES[10]*ALGEBRAIC[64]) - CONSTANTS[79]*STATES[37];
RATES[11] = (ALGEBRAIC[67]+ CONSTANTS[83]*STATES[39]*ALGEBRAIC[64]) - CONSTANTS[84]*STATES[11];
ALGEBRAIC[58] = RATES[32];
ALGEBRAIC[59] = RATES[33];
ALGEBRAIC[60] = CONSTANTS[61]*ALGEBRAIC[58]+ CONSTANTS[62]*ALGEBRAIC[59];
ALGEBRAIC[61] = 1.00000/(1.00000+( CONSTANTS[75]*CONSTANTS[72])/pow(CONSTANTS[72]+STATES[10], 2.00000)+( CONSTANTS[76]*CONSTANTS[73])/pow(CONSTANTS[73]+STATES[10], 2.00000));
ALGEBRAIC[68] = CONSTANTS[88] - (STATES[34]+STATES[40]);
RATES[10] = ALGEBRAIC[61]*((ALGEBRAIC[55] - (ALGEBRAIC[54]+ALGEBRAIC[60]))+- ( ((ALGEBRAIC[42]+ALGEBRAIC[44]) - 2.00000*ALGEBRAIC[37])*(( CONSTANTS[67]*CONSTANTS[3])/( 2.00000*CONSTANTS[68]*CONSTANTS[2])))+(( CONSTANTS[79]*STATES[37]+ CONSTANTS[81]*STATES[34]) - ( CONSTANTS[78]*STATES[10]*ALGEBRAIC[64]+ CONSTANTS[80]*STATES[10]*ALGEBRAIC[68])));
ALGEBRAIC[70] = (STATES[35] - STATES[34])/CONSTANTS[91];
RATES[35] = CONSTANTS[80]*STATES[24]*ALGEBRAIC[65] - ( ALGEBRAIC[70]*(CONSTANTS[93]/CONSTANTS[94])+ CONSTANTS[81]*STATES[35]);
ALGEBRAIC[71] = (STATES[41] - STATES[40])/CONSTANTS[92];
RATES[41] = CONSTANTS[89]*STATES[38]*ALGEBRAIC[65] - ( ALGEBRAIC[71]*(CONSTANTS[93]/CONSTANTS[94])+ CONSTANTS[90]*STATES[41]);
RATES[34] = (ALGEBRAIC[70]+ CONSTANTS[80]*STATES[10]*ALGEBRAIC[68]) - CONSTANTS[81]*STATES[34];
RATES[40] = (ALGEBRAIC[71]+ CONSTANTS[89]*STATES[39]*ALGEBRAIC[68]) - CONSTANTS[90]*STATES[40];
ALGEBRAIC[69] = (STATES[38] - STATES[39])/CONSTANTS[87];
RATES[38] = ( CONSTANTS[84]*STATES[42]+ CONSTANTS[90]*STATES[41]) - ( CONSTANTS[83]*STATES[38]*ALGEBRAIC[63]+ CONSTANTS[89]*STATES[38]*ALGEBRAIC[65]+ ALGEBRAIC[69]*(CONSTANTS[93]/CONSTANTS[94]));
RATES[39] = (ALGEBRAIC[69]+ CONSTANTS[84]*STATES[11]+ CONSTANTS[90]*STATES[40]) - ( CONSTANTS[83]*STATES[39]*ALGEBRAIC[64]+ CONSTANTS[89]*STATES[39]*ALGEBRAIC[68]);
}
void
computeVariables(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC)
{
ALGEBRAIC[1] = (STATES[0]<- 40.0000 ? 135.000*exp((80.0000+STATES[0])/- 6.80000) : 0.00000);
ALGEBRAIC[11] = (STATES[0]<- 40.0000 ? 3560.00*exp( 0.0790000*STATES[0])+ 310000.*exp( 0.350000*STATES[0]) : 1000.00/( 0.130000*(1.00000+exp((STATES[0]+10.6600)/- 11.1000))));
ALGEBRAIC[2] = (STATES[0]<- 40.0000 ? ( 1000.00*- ( 127140.*exp( 0.244400*STATES[0])+ 3.47400e-05*exp( - 0.0439100*STATES[0]))*(STATES[0]+37.7800))/(1.00000+exp( 0.311000*(STATES[0]+79.2300))) : 0.00000);
ALGEBRAIC[12] = (STATES[0]<- 40.0000 ? ( 121.200*exp( - 0.0105200*STATES[0]))/(1.00000+exp( - 0.137800*(STATES[0]+40.1400))) : ( 300.000*exp( - 2.53500e-07*STATES[0]))/(1.00000+exp( - 0.100000*(STATES[0]+32.0000))));
ALGEBRAIC[14] = 0.00100000/(( 7.19000e-05*(STATES[0] - 10.0000))/(1.00000 - exp( - 0.148000*(STATES[0] - 10.0000)))+( 0.000131000*(STATES[0] - 10.0000))/(exp( 0.0687000*(STATES[0] - 10.0000)) - 1.00000));
ALGEBRAIC[4] = 1.00000/(1.00000+exp(- (STATES[0] - 24.7000)/13.6000));
ALGEBRAIC[5] = 45.1600*exp( 0.0357700*STATES[0]);
ALGEBRAIC[15] = 98.9000*exp( - 0.0623700*STATES[0]);
ALGEBRAIC[6] = ( 5.41500*exp(- (STATES[0]+33.5000)/5.00000))/(1.00000+ 0.0513350*exp(- (STATES[0]+33.5000)/5.00000));
ALGEBRAIC[16] = ( 5.41500*exp((STATES[0]+33.5000)/5.00000))/(1.00000+ 0.0513350*exp((STATES[0]+33.5000)/5.00000));
ALGEBRAIC[8] = 0.800000/(1.00000+exp((STATES[0]+12.5000)/5.00000))+0.200000;
ALGEBRAIC[18] = (20.0000+600.000/(1.00000+exp((STATES[0]+20.0000)/9.50000)))/1000.00;
ALGEBRAIC[0] = STATES[0]+47.1300;
ALGEBRAIC[10] = (fabs(ALGEBRAIC[0])<1.00000e-05 ? 320.000/(0.100000 - 0.00500000*ALGEBRAIC[0]) : ( 320.000*ALGEBRAIC[0])/(1.00000 - exp( - 0.100000*ALGEBRAIC[0])));
ALGEBRAIC[20] = 80.0000*exp(- STATES[0]/11.0000);
ALGEBRAIC[3] = exp(- 5.49500+ 0.169100*STATES[0]);
ALGEBRAIC[13] = exp(- 7.67700 - 0.0128000*STATES[0]);
ALGEBRAIC[21] = ALGEBRAIC[3]/(ALGEBRAIC[3]+ALGEBRAIC[13]);
ALGEBRAIC[24] = 0.00100000/(ALGEBRAIC[3]+ALGEBRAIC[13])+ CONSTANTS[13]*0.0270000;
ALGEBRAIC[7] = 400.000*exp((STATES[0]+2.00000)/10.0000);
ALGEBRAIC[17] = 50.0000*exp(- (STATES[0]+2.00000)/13.0000);
ALGEBRAIC[27] = ( 103.750*STATES[24])/1.00000;
ALGEBRAIC[22] = ALGEBRAIC[7]*CONSTANTS[36];
ALGEBRAIC[25] = ALGEBRAIC[17]/CONSTANTS[37];
ALGEBRAIC[19] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log(CONSTANTS[10]/STATES[1]);
ALGEBRAIC[23] = CONSTANTS[9]*pow(STATES[2], 3.00000)*STATES[3]*STATES[4]*(STATES[0] - ALGEBRAIC[19]);
ALGEBRAIC[37] = (( CONSTANTS[21]*5000.00)/( (pow(CONSTANTS[20], 3.00000)+pow(CONSTANTS[10], 3.00000))*(CONSTANTS[19]+CONSTANTS[24])*(1.00000+ CONSTANTS[22]*exp(( (CONSTANTS[23] - 1.00000)*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])))))*( exp(( CONSTANTS[23]*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*pow(STATES[1], 3.00000)*CONSTANTS[24] - exp(( (CONSTANTS[23] - 1.00000)*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*pow(CONSTANTS[10], 3.00000)*STATES[10]);
ALGEBRAIC[38] = 1.00000/(1.00000+ 0.124500*exp(( - 0.100000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))+ 0.0365000*CONSTANTS[96]*exp(( - STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])));
ALGEBRAIC[39] = ( (( CONSTANTS[25]*ALGEBRAIC[38])/(1.00000+pow(CONSTANTS[26]/STATES[1], 1.50000)))*CONSTANTS[12])/(CONSTANTS[12]+CONSTANTS[27]);
ALGEBRAIC[40] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[39];
ALGEBRAIC[45] = CONSTANTS[32]*(STATES[0] - ALGEBRAIC[19]);
ALGEBRAIC[9] = (VOI>=CONSTANTS[4]&&VOI<=CONSTANTS[5]&&(VOI - CONSTANTS[4]) - floor((VOI - CONSTANTS[4])/CONSTANTS[6])*CONSTANTS[6]<=CONSTANTS[7] ? CONSTANTS[8] : 0.00000);
ALGEBRAIC[46] = ( (( (CONSTANTS[33]/( 1.00000*1.00000))*4.00000*STATES[0]*pow(CONSTANTS[2], 2.00000)*1000.00)/( CONSTANTS[0]*CONSTANTS[1]))*( 0.00100000*exp(( 2.00000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 0.341000*CONSTANTS[24]))/(exp(( 2.00000*STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 1.00000);
ALGEBRAIC[47] = ALGEBRAIC[46]*STATES[25]*(STATES[12]+STATES[13]);
ALGEBRAIC[48] = CONSTANTS[34]/(1.00000+ALGEBRAIC[46]/CONSTANTS[35]);
ALGEBRAIC[50] = ( (( (ALGEBRAIC[48]/( 1.00000*1.00000))*STATES[25]*(STATES[12]+STATES[13])*STATES[0]*pow(CONSTANTS[2], 2.00000))/( CONSTANTS[0]*CONSTANTS[1]))*( STATES[5]*exp(( STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - CONSTANTS[12]))/(exp(( STATES[0]*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1])) - 1.00000);
ALGEBRAIC[26] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log(CONSTANTS[12]/STATES[5]);
ALGEBRAIC[28] = 1.00000/(1.00000+ 1.49450*exp( 0.0446000*STATES[0]));
ALGEBRAIC[29] = CONSTANTS[11]*CONSTANTS[95]*ALGEBRAIC[28]*STATES[6]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[30] = (( CONSTANTS[0]*CONSTANTS[1])/CONSTANTS[2])*log((CONSTANTS[12]+ 0.0183300*CONSTANTS[10])/(STATES[5]+ 0.0183300*STATES[1]));
ALGEBRAIC[31] = CONSTANTS[14]*pow(STATES[7], 2.00000)*(STATES[0] - ALGEBRAIC[30]);
ALGEBRAIC[32] = CONSTANTS[15]*STATES[8]*STATES[9]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[33] = 1.00000/(2.00000+exp( (( 1.50000*CONSTANTS[2])/( CONSTANTS[0]*CONSTANTS[1]))*(STATES[0] - ALGEBRAIC[26])));
ALGEBRAIC[34] = (( CONSTANTS[16]*ALGEBRAIC[33]*CONSTANTS[12])/(CONSTANTS[12]+CONSTANTS[17]))*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[35] = 1.00000/(1.00000+exp((7.48800 - STATES[0])/5.98000));
ALGEBRAIC[36] = CONSTANTS[18]*ALGEBRAIC[35]*(STATES[0] - ALGEBRAIC[26]);
ALGEBRAIC[41] = ( CONSTANTS[30]*STATES[10])/(CONSTANTS[29]+STATES[10]);
ALGEBRAIC[42] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[41];
ALGEBRAIC[43] = (( CONSTANTS[0]*CONSTANTS[1])/( 2.00000*CONSTANTS[2]))*log(CONSTANTS[24]/STATES[10]);
ALGEBRAIC[44] = CONSTANTS[31]*(STATES[0] - ALGEBRAIC[43]);
ALGEBRAIC[51] = pow(STATES[10]/CONSTANTS[52], CONSTANTS[57]);
ALGEBRAIC[52] = pow(STATES[31]/CONSTANTS[53], CONSTANTS[58]);
ALGEBRAIC[53] = ( CONSTANTS[56]*( CONSTANTS[54]*ALGEBRAIC[51] - CONSTANTS[55]*ALGEBRAIC[52]))/(1.00000+ALGEBRAIC[51]+ALGEBRAIC[52]);
ALGEBRAIC[54] = (STATES[11]/CONSTANTS[28])*ALGEBRAIC[53];
ALGEBRAIC[56] = (STATES[31] - STATES[30])/CONSTANTS[59];
ALGEBRAIC[49] = CONSTANTS[43]*(STATES[26]+STATES[27])*(STATES[30] - STATES[24]);
ALGEBRAIC[57] = 1.00000/(1.00000+( CONSTANTS[77]*CONSTANTS[74])/pow(CONSTANTS[74]+STATES[30], 2.00000));
ALGEBRAIC[55] = (STATES[24] - STATES[10])/CONSTANTS[60];
ALGEBRAIC[62] = 1.00000/(1.00000+( CONSTANTS[75]*CONSTANTS[72])/pow(CONSTANTS[72]+STATES[24], 2.00000)+( CONSTANTS[76]*CONSTANTS[73])/pow(CONSTANTS[73]+STATES[24], 2.00000));
ALGEBRAIC[65] = CONSTANTS[88] - (STATES[35]+STATES[41]);
ALGEBRAIC[63] = CONSTANTS[82] - (STATES[36]+STATES[42]);
ALGEBRAIC[66] = (STATES[36] - STATES[37])/CONSTANTS[85];
ALGEBRAIC[67] = (STATES[42] - STATES[11])/CONSTANTS[86];
ALGEBRAIC[64] = CONSTANTS[82] - (STATES[37]+STATES[11]);
ALGEBRAIC[58] = RATES[32];
ALGEBRAIC[59] = RATES[33];
ALGEBRAIC[60] = CONSTANTS[61]*ALGEBRAIC[58]+ CONSTANTS[62]*ALGEBRAIC[59];
ALGEBRAIC[61] = 1.00000/(1.00000+( CONSTANTS[75]*CONSTANTS[72])/pow(CONSTANTS[72]+STATES[10], 2.00000)+( CONSTANTS[76]*CONSTANTS[73])/pow(CONSTANTS[73]+STATES[10], 2.00000));
ALGEBRAIC[68] = CONSTANTS[88] - (STATES[34]+STATES[40]);
ALGEBRAIC[70] = (STATES[35] - STATES[34])/CONSTANTS[91];
ALGEBRAIC[71] = (STATES[41] - STATES[40])/CONSTANTS[92];
ALGEBRAIC[69] = (STATES[38] - STATES[39])/CONSTANTS[87];
}