An exponentially convergent algorithm for parallel computation of eigenpairs of operator equations

Ivan Gavrilyuk

A new algorithm for operator eigenvalue problems in a Hilbert space is proposed which possesses the convergence rate of a geometric progression with a controlled denominator depending inversely proportional from the index of the eigenvalue. All eigenpairs can be computed in parallel or separate from each other. The talk is based on joint works with V.Makarov.