April 11th, 2018, 02:43 AM  #1 
Member Joined: Nov 2016 From: Kansas Posts: 70 Thanks: 0  Convergence of an iteration
We have the following iteration: $x^{(k)}$ = G$x^{(k)}$ +b Spectral radius of A=10 and has eigenvalues > 5 Reason of not covergence is obvious. But how do we make it converge through either Jacobi, Gauss Siedel or SOR? 
April 11th, 2018, 10:15 AM  #2 
Senior Member Joined: Sep 2015 From: USA Posts: 1,847 Thanks: 953 
what do you mean "make" it converge?

April 11th, 2018, 12:22 PM  #3 
Member Joined: Nov 2016 From: Kansas Posts: 70 Thanks: 0 
Like make the method of iteration convergent.


Tags 
convergence, gauss seidel, iteration, jacobi, numerical analysis 
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