I have a graph laplacian, for which I need to find out the largest 'k' eigen values and eigen vectors. I am using something like this :-
#L= laplacian matrix. eigVal,eigVectors = eigsh(L, k, which='LA')
This is giving me approximately correct results, but something's going wrong and I am getting eig values slightly greater than 1 (say 1.05). In my case the eigen values are upper bounded by 1. when using MATLAB and other platforms I am getting desired results.
What am I doing wrong here?? Is there any way by which I can parallelize the computation of eigen vectors and values? (I am considering pyCuda.)