Krylov subspace restarting for matrix Laplace transforms

Abstract: A common way to approximate F (A)b-the action of a matrix function on a vectoris to use the Arnoldi approximation. Since a new vector needs to be generated and stored in every iteration, one is often forced to rely on restart algorithms which are either not efficient, not stable or only applicable to restricted classes of functions. We present a new representation of the error of the Arnoldi iterates if the function F is given as a Laplace transform. Based on this representation we build an efficient and stabl… Show more