What is the steady state criteria in crank nicolson scheme, especially impilicit finite difference method? and How to stop time level when steady state is reached?
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I'm dealing with unsteady case in my code. so, the CN term updated in each time step and it ran upto final time (tmax=100). but i want to stop the time level when steady state is reached. how to include steady state criteria in my code? and what is the steady state criteria?
clc; clear all; close all
xmax=1; ymax=7; tmax=10; m=20; n=28; nt=500;
dx=xmax/m; dy=ymax/n; dt=tmax/nt; y=dy:dy:ymax;
%====================INTIALIZATION===============================%
UOLD=zeros(m,n); VOLD=zeros(m,n);
CNEW=0;COLD=ones(m,n);
tic
CN=COLD;
for j=1:n
for i=1:m
C(i)=((dt*VOLD(i,j))/(4*dy))-(dt/(2*(dy^2)));
A(i)=((-dt*VOLD(i,j))/(4*dy))-(dt/(2*(dy^2)));
B(i)=1+((dt*UOLD(i,j))/(2*dx))+(dt/(dy^2));
end
end
for j=2:n
for i=1:m
D(i)=(-dt*UOLD(i,j)*((-CNEW+COLD(i,j)-CNEW)/(2*dx)))+((dt*(1/(2*dy^2)))*(COLD(i+1,j)-(2*COLD(i,j))+CNEW))-(((dt*VOLD(i,j))/(4*dy))*(CNEW-COLD(i+1,j)-COLD(i,j)));
end
end
dt=0.2+dt;
CN(i,j)=TriDiag(A,B,C,D);
toc
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Answers (1)
Torsten
on 27 Mar 2023
Moved: Torsten
on 27 Mar 2023
You can define several stopping criteria.
Try
max(abs(1-CN(:)./COLD(:))) < tol
with tol = 1e-4 ... 1e-6
4 Comments
Torsten
on 28 Mar 2023
Edited: Torsten
on 28 Mar 2023
"dt" is used as the time increment in your code, not as the absolute time.
Thus setting dt = 0.2+dt and thus making the time increment bigger and bigger makes no sense.
If your equations do not explicitly depend on time, you will only see the time increment "dt" in their discretized form, not the absolute time "t" itself.
Torsten
on 29 Mar 2023
In your double loops over i and j, the arrays A(i), B(i), C(i) and D(i) are permanently overwritten when j changes. So in the end, the A(i), B(i), C(i) and D(i) are the results for j=n before you call TriDiag. So somehow you will have to work with A(i,j), B(i,j), C(i,j) and D(i,j) to capture the j dependence of the coefficients.
Then I guess the CN and COLD arrays should depend on i, j and time (thus they should be three-dimensional instead of two-dimensional matrices), shouldn't they ?
Further, the j in my piece of code refers to time. You will have to choose another index apart from i and j, maybe itime.
j = 1;
while t < tmax && max_difference > tol
j = j + 1;
t = t + dt;
% Compute solution C for new time
...
% Save solution in matrix C
C(:,j) = solution at time step j;
% Compute maximum difference of the solution between the last two
% output times
max_difference = max ( abs(C(:,j)-C(:,j-1))./max(1,abs(C(:,j-1))) );
end
Maybe you should include the partial differential equation you are trying to solve in a mathematical notation so that I get an idea what problem you are trying to discretize here.
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