Approximating the inverse of a diagonally dominant matrix with positive elements

Abstract

For an n× n diagonally dominant matrix T=(ti,j)n× n with positive elements satisfying certain bounding conditions, we propose to use a diagonal matrix S=(si,j)n× n to approximate the inverse of T, where si,j=δi,j/ti,i and δi,j is the Kronecker delta function. We derive an explicitly upper bound on the approximation error, which is in the magnitude of O(n-2). It shows that S is a very good approximation to T-1.