Strongly geodesic preinvexity and Strongly Invariant {\eta}-Monotonicity   on Riemannian Manifolds and its Application

Akhlad Iqbal; Askar Hussain; Hilal Ahmad Bhat

arXiv:2302.02841·math.OC·February 7, 2023

Strongly geodesic preinvexity and Strongly Invariant {\eta}-Monotonicity on Riemannian Manifolds and its Application

Akhlad Iqbal, Askar Hussain, Hilal Ahmad Bhat

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TL;DR

This paper introduces new concepts of strongly geodesic preinvexity, strongly {\

Contribution

It defines and characterizes strongly geodesic preinvexity and {\

Findings

01

Characterization of these functions under Condition C

02

Construction of non-trivial examples

03

Solution to variational-like inequality problem

Abstract

In this paper, we present strongly geodesic preinvexity on Riemannian manifolds (RM) and strongly {\eta}-invexity of order m on RM. Furthermore, we define strongly invariant {\eta}-monotonicity of order m on RM. Under Condition C, an important characterization of these functions are studied. We construct several non-trivial examples in support of these definitions. Afterwords, an important and significant characterization of a strict {\eta}-minimizers ({\eta}-minimizers)of order m for MOP and a solution to the variational like-inequality problem (VVLIP) has been derived.

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Taxonomy

TopicsContact Mechanics and Variational Inequalities · Optimization and Variational Analysis · Analytic and geometric function theory