Sufficient conditions for the unique solvability of absolute value matrix equations

Abstract

In this paper, we discussed the unique solvability of the two absolute value matrix equations. The unique solvability condition ( A-1 B )<1 is provided for the generalized absolute value matrix equation (GAVME) AX + B X = F. This condition is superior to that of Kumar et al. [J. Numer. Anal. Approx. Theory, 51(1) (2022) 83-87]. We also discussed different conditions for the unique solvability of the new generalized absolute value matrix equation (NGAVME) AX+B CX =F with A, B, C, F, X ∈ Rn × n. We also provided the corrected version of Corollary 2.1 from the published work by Wang et al. [Appl. Math. Lett., 116 (2021) 106966].