Positive coincidence points for a class of nonlinear operators and their applications to matrix equations

Kedim Imed; Berzig Maher; Ajmi Ahdi Noomen

doi:10.1515/math-2020-0049

Open Mathematics (Aug 2020)

Positive coincidence points for a class of nonlinear operators and their applications to matrix equations

Kedim Imed,
Berzig Maher,
Ajmi Ahdi Noomen

Affiliations

Kedim Imed: Department of Mathematics, College of Science and Humanities in Al-Sulail, Prince Sattam bin Abdulaziz University, Saudi Arabia
Berzig Maher: Université de Tunis, Ecole Nationale Supérieure d’Ingénieurs de Tunis, Département de Mathématiques, 1008 Montfleury, Tunisie
Ajmi Ahdi Noomen: Department of Mathematics, College of Science and Humanities in Al-Sulail, Prince Sattam bin Abdulaziz University, Saudi Arabia

DOI: https://doi.org/10.1515/math-2020-0049
Journal volume & issue: Vol. 18, no. 1
pp. 858 – 872

Abstract

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Consider an ordered Banach space and f,gf,g two self-operators defined on the interior of its positive cone. In this article, we prove that the equation f(X)=g(X)f(X)=g(X) has a positive solution, whenever f is strictly α\alpha -concave g-monotone or strictly (−α)(-\alpha )-convex g-antitone with g super-homogeneous and surjective. As applications, we show the existence of positive definite solutions to new classes of nonlinear matrix equations.

Published in Open Mathematics

ISSN: 2391-5455 (Online)
Publisher: De Gruyter
Country of publisher: Poland
LCC subjects: Science: Mathematics
Website: https://www.degruyter.com/journal/key/math/html

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