Inaccuracy in solving simultaneous equations using matrix

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Susmit Kumar Mishra
Susmit Kumar Mishra on 3 Jun 2020
Edited: Walter Roberson on 3 Jun 2020
So i was solving a system of n linear equations. My coefficient matrix is a tridiagonal one.
However as i was decreasing the values inside matrix or increasing n the error was increasing rapidly.
clear
n=1000;
B=(1:n);
B=B';
A=full(gallery('tridiag',n,0.341,0.232,0.741));
x=A\B;
c=A*x-B;
error=0;
for i=1:n
error=error+abs(c(i,1));
end
error
%error = 2.174626266011847e+155
Here the system is in the form Ax=B
ideally c should contain only zero.
Can anyone a suggest a method so that i can decrease the net error.
NOTE: I also tried the Thomas Algorithm even that gave an error of similar order .
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Susmit Kumar Mishra
Susmit Kumar Mishra on 3 Jun 2020
How can one solve system of equations involving variable names in an array using symbolic toolbox.
Can you just give an example by solving above set of equations in symbolic toolbox and display the corresponding error.
Walter Roberson
Walter Roberson on 3 Jun 2020
Edited: Walter Roberson on 3 Jun 2020
n = 1000;
B = (1:n).';
A = sym( full(gallery('tridiag',n,0.341,0.232,0.741)) ); %11 seconds
x = A\B; %not fast!! 43 seconds
c = A*x-B;
error = sum(abs(c));
disp(error)

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Accepted Answer

Bjorn Gustavsson
Bjorn Gustavsson on 3 Jun 2020
If you run this code-snippet:
N = round(logspace(1,3,7));
for i1 = 1:numel(N),
n = N(i1);
B=(1:n)';
A=full(gallery('tridiag',n,0.341,0.232,0.741));
[U,S,V] = svd(A);
ph(i1) = plot(diag(S),'.-','linewidth',2,'markersize',15,'color',rand(1,3));
title(n)
drawnow
end
% Pause
set(gca,'xscale','log')
% Pause
set(gca,'yscale','log')
You will see that the smallest eigenvalue is way smaller than the next smallest. Such matrices A are illconditioned and are a bit more problematic to solve. For more information and better tools to handle such problems have a look at regtools.
HTH

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