On new existence of a unique common solution to a pair of non-linear matrix equations

Abstract

The main goal of this article is to study the existence of a unique positive definite common solution to a pair of matrix equations of the form eqnarray* Xr=Q1 + Σi=1m Ai*F(X)Ai and Xs=Q2 + Σi=1m Ai*G(X)Ai eqnarray* where Q1,Q2∈ P(n), Ai∈ M(n) and F,G:P(n) P(n) are certain functions and r,s>1. In order to achieve our target, we take the help of elegant properties of Thompson metric on the set of all n × n Hermitian positive definite matrices. To proceed this, we first derive a common fixed point result for a pair of mappings utilizing a certain class of control functions in a metric space. Then, we obtain some sufficient conditions to assure a unique positive definite common solution to the said equations. Finally, to validate our results, we provide a couple of numerical examples with diagrammatic representations of the convergence behaviour of iterative sequences.