I have two 50,000 x 50,000 symmetric real matrices A and B (double precision) which are non-sparse (55% non-zero). B is positive-definite.
I have this generalized eigenproblem: A v = µ B v
I need to find 3 - 4 of the smallest algebraic eigenvalues (and if possible their associated eigenvectors).
Do I have still any options left to compute them on an average computer with 12 GB of RAM?
Any suggestions that I can either try without much effort or that definitely work. Thanks!