Theoretical analysis and numerical solution to a vector equation Ax-\|x\|1x=b

Abstract

Theoretical and computational properties of a vector equation Ax-\|x\|1x=b are investigated, where A is an invertible M-matrix and b is a nonnegative vector. Existence and uniqueness of a nonnegative solution is proved. Fixed-point iterations, including a relaxed fixed-point iteration and Newton iteration, are proposed and analyzed. A structure-preserving doubling algorithm is proved to be applicable in computing the required solution, the convergence is at least linear with rate 1/2. Numerical experiments are performed to demonstrate the effectiveness of the proposed algorithms.