Optimal Solvers for Linear Systems with Fractional Powers of Sparse SPD Matrices

Abstract

In this paper we consider efficient algorithms for solving the algebraic equation Aα u= f, 0< α<1, where A is a symmetric and positive definite matrix obtained form finite difference or finite element approximations of second order elliptic problems in Rd, d=1,2,3. The method is based on the best uniform rational approximation of the function tβ-α for 0 < t 1 and natural β, and the assumption that one has at hand an efficient method (e.g. multigrid, multilevel, or other fast algorithm) for solving equations like ( A +c I) u= f, c 0. The provided numerical experiments on model problems with A obtained by finite element approximation of elliptic equations in one and three spacial dimensions confirm the efficiency of the proposed algorithms.