Title: | On sufficient "local" conditions for existence results to generalized p(.)-Laplace equations involving critical growth |
Author(s): | Ky Ho |
Keywords: | Leray-Lions-type operators; Critical growth; Concentration-compactness principle; Variational methods |
Abstract: | In this article, we study the existence of multiple solutions to a generalized p(?) -Laplace equation with two parameters involving critical growth. More precisely, we give sufficient �local� conditions, which mean that growths between the main operator and nonlinear term are locally assumed for p(?) -sublinear, p(?) -superlinear, and sandwich-type cases. Compared to constant exponent problems (e.g., p -Laplacian and (p,q) -Laplacian), this characterizes the study of variable exponent problems. We show this by applying variants of the mountain pass theorem for p(?) -sublinear and p(?) -superlinear cases and constructing critical values defined by a minimax argument in the genus theory for sandwich-type case. Moreover, we also obtain a nontrivial nonnegative solution for sandwich-type case changing the role of parameters. Our work is a generalization of several existing works in the literature. |
Issue Date: | 2023 |
Publisher: | De Gruyter |
Series/Report no.: | Vol. 12, No. 1 |
URI: | https://digital.lib.ueh.edu.vn/handle/UEH/68826 |
DOI: | https://doi.org/10.1515/anona-2022-0269 |
ISSN: | 2191-950X |
Appears in Collections: | INTERNATIONAL PUBLICATIONS
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