# Numerical Integration of a series of ODEs in python

I got n 2nd order linked ODEs which I then reduced to first-order ODEs and solved using the lsode integrator. It seems that in python the link between the ODEs is lost. Using almost exactly the same code in octave leads to the wanted result.

These are the respective codes:

``````import math
import  scipy.integrate.odepack as Int
import numpy as np
import math
from scipy.integrate import odeint

modes = 6

q = np.zeros(modes*2)
q0 = np.zeros(modes*2)
qdot = np.zeros(modes*2)

def fun(q, t):

modes=6;
alpha=1;
nu=0.3;
mu=0.01;
M=2;
P=0;
lam=500;
R=0;

for N in range(modes):

sum_1=0
sum_2=0

qdot[2*N]=q[2*N+1]
Np=N+1
for j in range(modes):
jp =j+1

if j != N:
sum_1+=((1-((-1)**(jp+Np)))/((Np**2)-(jp**2)))*jp*Np*q[2*j]

for j in range(modes):
jp =j+1
sum_2+=((jp*math.pi)**2)/2*((q[2*j])**2)

qdot[2*N+1]=-q[2*N]*(Np*math.pi)**4-alpha*6*(1-nu**2)*sum_2*q[2*N]*(Np*math.pi)**2-R*q[2*N]*(Np*math.pi)**2-2*lam*sum_1-(mu*lam/M)**0.5*q[2*N+1]+P*(1-((-1)**Np))/Np/math.pi

return qdot

# Boundary conditions

q0[0] = 1
q0[1] = 2

# Start normalized time
t0 = 0
# End normalized time
t1 = 2

timeStep = 0.001

# Physikalische Zeit definieren und ODE loesen:

t = np.arange(t0,t1,timeStep)

q = odeint(fun, q0, t)
``````

And the octave code:

`````` clear all
clc

modes=6;

q = zeros(2*modes,1);
q0 = zeros(2*modes,1);

function qdot = f (q,t);

modes=6;
alpha=1;
nu=0.3;
mu=0.01;
M=2;
P=0;
lam=500;
R=0;

for N = 1:modes

sum_1=0;
sum_2=0;

qdot(2*N-1,1)=q(2*N,1);

for j = 1:modes

if j != N
sum_1 = sum_1 + ((1-((-1)**(j+N)))/((N**2)-(j**2)))*j*N*q(2*j-1,1);
endif
endfor

for m = 1:modes

sum_2 = sum_2 +((m*pi)**2)/2*((q(2*m-1,1))**2);
endfor

qdot(2*N,1)=-q(2*N-1,1)*(N*pi)**4-alpha*6*(1-nu**2)*sum_2*q(2*N-1,1)*(N*pi)**2-R*q(2*N-1,1)*(N*pi)**2-2*lam*sum_1-(mu*lam/M)**0.5*q((2*N),1)+P*(1-((-1)**N))/N/pi;

endfor

endfunction

# Boundary conditions

q0(1,1)=1;
q0(2,1)=2;

# Start normalized time
t0 = 0;
# End normalized time
t1 = 2;

timeStep= 0.001;

M = round((t1-t0)/timeStep);

# Integration
q = lsode ("f",q0,(t = linspace (t0,t1,M)'));
``````

I have tried different arrangements of the ODEs in python but none seem to give the right answer, I also have tried different solvers and they do not change the result as well as changing the initial conditions.

Thank you very much for any ideas/solutions to my problem

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