Global existence of weak solutions to a class of higher-order nonlinear evolution equations

Li-ming Xiao; Cao Luo; Jie Liu

doi:10.3934/era.2024248

Electronic Research Archive (Sep 2024)

Global existence of weak solutions to a class of higher-order nonlinear evolution equations

Li-ming Xiao,
Cao Luo,
Jie Liu

Affiliations

Li-ming Xiao: Teaching Department of Mathematics and Physics, Guangzhou Institute of Science and Technology, Guangzhou 510540, China
Cao Luo: School of Mathematics and Systems Science, Guangdong Polytechnic Normal University, Guangzhou 510665, China
Jie Liu: School of Mathematics and Systems Science, Guangdong Polytechnic Normal University, Guangzhou 510665, China

DOI: https://doi.org/10.3934/era.2024248
Journal volume & issue: Vol. 32, no. 9
pp. 5357 – 5376

Abstract

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This paper deals with the initial boundary value problem for a class of n-dimensional higher-order nonlinear evolution equations that come from the viscoelastic mechanics and have no positive definite energy. Through the analysis of functionals containing higher-order energy of motion, a modified potential well with positive depth is constructed. Then, using the potential well method, and Galerkin method, it has been shown that when the initial data starts from the stable set, there exists a global weak solution to such an evolution problem.

Published in Electronic Research Archive

ISSN: 2688-1594 (Online)
Publisher: AIMS Press
Country of publisher: United States
LCC subjects: Science: Mathematics; Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods
Website: https://www.aimspress.com/journal/era

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