Geometrical inverse preconditioning for symmetric positive definite matrices

Abstract

We focus on inverse preconditioners based on minimizing F(X) = 1-(XA,I), where XA is the preconditioned matrix and A is symmetric and positive definite. We present and analyze gradient-type methods to minimize F(X) on a suitable compact set. For that we use the geometrical properties of the non-polyhedral cone of symmetric and positive definite matrices, and also the special properties of F(X) on the feasible set. Preliminary and encouraging numerical results are also presented in which dense and sparse approximations are included.