Hello,
I have a system of linear algebraic equations formed by the nodal equations of a linear electric circuit. The nodal voltages are the unknowns. There are 16 unknowns.
sage runs forever and in the end I obtain:
RuntimeError: ECL says: Memory limit reached. Please jump to an outer pointer,
quit program and enlarge the
memory limits before executing the program again.
Am I missing something or doing something wrong ? It is possible that sage cannot solve this linear algebraic system in a reasonable (short) time with "only" 16 unknowns ?
The unknowns are
[V_3, V_4, V_5, V_8, V_7, V_1, V_8, V_10, V_9l, V_4, V_4, V_7, V_2, V_3, V_6, V_9]
and the system is:
[V_10/RLOAD + ((V_1 - V_8)*K1*sqrt(Ltrafo6) - sqrt(Ltrafo5)*V_10)/((K1^2*Ltrafo6*s - Ltrafo6*s)*sqrt(Ltrafo5)) == 0,
-(V_9 - V_9l)/RL2 + ((V_4 - V_7)*(K3*K4 - K2)*sqrt(L1)*sqrt(L2) + ((K4^2 - 1)*(V_4 - V_9l)*sqrt(L1) + (V_2 - V_3)*(K2*K4 - K3)*sqrt(L2))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*sqrt(L1)*L2*sqrt(L3)) == 0,
(V_1 - V_7)/R4 + (V_1 - V_2)/R1 + V_1/RI + (K1*sqrt(Ltrafo5)*V_10 - (V_1 - V_8)*sqrt(Ltrafo6))/((K1^2*Ltrafo5*s - Ltrafo5*s)*sqrt(Ltrafo6)) - ICC_small_signal_0_1(s) == 0,
(V_3 - V_4)*CBC_Q1*s + (V_4 - V_5)*GM_Q1 + (V_3 - V_5)/RO_Q1 - ((V_4 - V_7)*(K2*K3 - K4)*sqrt(L1)*sqrt(L2) - ((K2^2 - 1)*(V_2 - V_3)*sqrt(L2) + (V_4 - V_9l)*(K2*K4 - K3)*sqrt(L1))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*L1*sqrt(L2)*sqrt(L3)) == 0,
Cbp1*V_2*s - (V_1 - V_2)/R1 + V_2/RCbp1 + ((V_4 - V_7)*(K2*K3 - K4)*sqrt(L1)*sqrt(L2) - ((K2^2 - 1)*(V_2 - V_3)*sqrt(L2) + (V_4 - V_9l)*(K2*K4 - K3)*sqrt(L1))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*L1*sqrt(L2)*sqrt(L3)) == 0,
(V_5 - V_7)*CBE_Q2*s + (V_5 - V_7)*GM_Q2 - (V_4 - V_5)*GM_Q1 + (V_5 - V_8)/RO_Q2 + (V_5 - V_7)/RPI_Q2 - (V_4 - V_5)/RPI_Q1 - (V_3 - V_5)/RO_Q1 + (V_5 - V_6)/(LRFC1*s) == 0, -(V_3 - V_4)*CBC_Q1*s + (V_4 - V_5)/RPI_Q1 - ((V_4 - V_7)*(K3*K4 - K2)*sqrt(L1)*sqrt(L2) + ((K4^2 - 1)*(V_4 - V_9l)*sqrt(L1) + (V_2 - V_3)*(K2*K4 - K3)*sqrt(L2))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*sqrt(L1)*L2*sqrt(L3)) - ((K3^2 - 1)*(V_4 - V_7)*sqrt(L1)*sqrt(L2) + ((V_4 - V_9l)*(K3*K4 - K2)*sqrt(L1) - (V_2 - V_3)*(K2*K3 - K4)*sqrt(L2))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*sqrt(L1)*sqrt(L2)*L3) == 0,
(V_7 - V_8)*CBC_Q2*s - (V_5 - V_7)*CBE_Q2*s + Cbp2*V_7*s - (V_5 - V_7)/RPI_Q2 - (V_1 - V_7)/R4 + V_7/R3 + ((K3^2 - 1)*(V_4 - V_7)*sqrt(L1)*sqrt(L2) + ((V_4 - V_9l)*(K3*K4 - K2)*sqrt(L1) - (V_2 - V_3)*(K2*K3 - K4)*sqrt(L2))*sqrt(L3))/((2*K2*K3*K4*s - K2^2*s - K3^2*s - K4^2*s + s)*sqrt(L1)*sqrt(L2)*L3) == 0,
V_6/R2 - (V_5 - V_6)/(LRFC1*s) == 0,
C2*V_9*s + (V_9 - V_9l)/RL2 == 0,
-(V_7 - V_8)*CBC_Q2*s - (V_5 - V_7)*GM_Q2 - (V_5 - V_8)/RO_Q2 - (K1*sqrt(Ltrafo5)*V_10 - (V_1 - V_8)*sqrt(Ltrafo6))/((K1^2*Ltrafo5*s - Ltrafo5*s)*sqrt(Ltrafo6)) == 0]
Thank you