Could anyone help me with this warning please?

5 Dez. 2014
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Aktualisiert 5 Jan. 2015
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This is my code :
function RunLogOscilNumeric3
k =10;
p0 =0.1;
t =(0:0.01:10000);
omega = 1;
N0 = 1;
[t,p]=ode23(@logOscilnumeric3,t,p0,[],omega,k,N0);
Pmax = max(p)
Pmean = mean(p)
figure(1)
plot(t,p)
title('The plot of the system with time')
xlabel ('Time')
ylabel ('The system' )
1;
% function dpdt = logOscilnumeric3(t,p,omega,k,N0)
% dpdt = N0*p - (N0*sin(omega*t)*p.^2/k);
% end
Notes: 1- Warning: Failure at t=5.060889e+00. Unable to meet integration tolerances without reducing the step size below the smallest value allowed (1.421085e-14) at time t.
2- I tried to change the ode solver ,,but I still got this warning.
3- I want to solve this system for the specific values of the parameters and time'' I do not want to change those at all'' ,, because I am trying to solve different systems for the same parameters and time vector.
What should I do please?
Thanks in advance.

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 Akzeptierte Antwort

Torsten
Torsten am 5 Dez. 2014

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The analytical solution for your ODE is given by
p(t)=20*exp(t)/(exp(t)*(cos(t)-sin(t))-201)
This function has a singularity between t=5 and t=5.5.
Best wishes
Torsten.

7 Kommentare
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Avan Al-Saffar
Avan Al-Saffar am 5 Dez. 2014
Many thanks. OMG singularity again,,it is like a bad dream for me!!! Do you have any suggestion please?
Avan Al-Saffar
Avan Al-Saffar am 12 Dez. 2014
Dear Torsten
When I solved the above system by details, I got this result which is different from yours,, Could you check it again please??
My result is : p(t)=20*exp(t)/(exp(t)*(sin(t)-cos(t))+1)
Torsten
Torsten am 13 Dez. 2014
The initial condition is not satisfied for your solution: p(0)=0.1.
Best wishes
Torsten.
Avan Al-Saffar
Avan Al-Saffar am 15 Dez. 2014
So what is the initial condition that you used to find the above result please?
Torsten
Torsten am 16 Dez. 2014
Sorry, I overlooked a minus sign:
p(t)=-20*exp(t)/(exp(t)*(cos(t)-sin(t))-201)
is the solution of the ODE
p'(t) - (p(t)-Sin[t]*p(t)^2/10) = 0, p(0)=0.1
Best wishes
Torsten.
Avan Al-Saffar
Avan Al-Saffar am 28 Dez. 2014
Dear Torsten If I have the following system : dx/dt = N0*sin(omega*t)*x - (N0*x.^2 / k)
I tried to solve it analytically but I am getting this formula which I can not continue:
( exp( (-N0/omega)*(cos(omega*t)) )/x)= ( integral( (N0/omega) * (exp( (-N0/omega) * (cos(omega*t)) )) )dt )
can you help me please?
Regards
Torsten
Torsten am 5 Jan. 2015
Try MATLAB's dsolve.
If an explicit solution can not be found, you will have to solve the equation numerically for given values of N0, omega and k.
Best wishes
Torsten.

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