Solving a class of nonlinear matrix equations via the coupled fixed point theorem
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摘要
We consider a class of nonlinear matrix equations of the type(1)X=Q+∑i=1mAi∗G(X)Ai-∑j=1kBj∗K(X)Bj,where Q is a positive definite matrix, Ai,Bj are arbitrary n×n matrices and G,K are two order-preserving or order-reversing continuous maps from H(n) into P(n). In this paper we first discuss existence and uniqueness of coupled fixed points in a L-space endowed with reflexive relation. Next on the basis of the coupled fixed point theorems, we prove the existence and uniqueness of positive definite solutions to such equations.
论文关键词:Coupled fixed point,L-space,Matrix equations,Positive define solution
论文评审过程:Available online 16 March 2015.
论文官网地址:https://doi.org/10.1016/j.amc.2015.02.049