Variational and nonvariational solutions for double phase variable exponent problems

TL;DR

This paper investigates two double-phase variable exponent problems, one non-variational and one variational, establishing existence of solutions using nonlinear operator theory and critical point methods.

Contribution

It introduces a framework for solving double-phase variable exponent problems in both non-variational and variational settings, demonstrating existence results.

Findings

Existence of at least one nontrivial solution for each problem

Application of Browder-Minty theory to non-variational problem

Use of Bonanno and Chinni's critical point theorem for variational problem

Abstract

In this article, we examine two double-phase variable exponent problems, each formulated within a distinct framework. The first problem is non-variational, as the nonlinear term may depend on the gradient of the solution. The first main result establishes an existence property from the nonlinear monotone operator theory given by Browder and Minty. The second problem is set up within a variational framework, where we employ a well-known critical point result by Bonanno and Chinn\`{\i}. In both cases, we demonstrate the existence of at least one nontrivial solution. To illustrate the practical application of the main results, we provide examples for each problem.