变指数、L <的非线性各向异性椭圆问题重正化解的存在唯一性

IF 1.4 Q2 MATHEMATICS, APPLIED International Journal of Differential Equations Pub Date : 2023-04-10 DOI:10.1155/2023/9454714
Ibrahime Konaté, Arouna Ouédraogo
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引用次数: 0

摘要

非线性偏微分方程被认为是描述许多自然现象行为的重要工具。一些现象的建模需要在指数不变的Sobolev空间中进行。但对于其他流体,如电流变流体,经典空间的性质不足以具有精度。为了克服这一困难,我们在称为Lebesgue和Sobolev空间的具有可变指数的适当空间中工作。在最近的工作中,研究人员被可变指数背景下的数学问题的研究所吸引。它们在弹性力学、流体力学和图像恢复等许多领域的应用激发了人们的极大兴趣。本文将Banach空间中的单调算子技术与逼近方法相结合,证明了一类含p的非线性各向异性问题重整化解的存在性⟶ . − Leray–Lions算子、一张图和L1数据。特别地,当图数据被认为是严格递增函数时,我们建立了解的唯一性。
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Existence and Uniqueness of Renormalized Solution to Nonlinear Anisotropic Elliptic Problems with Variable Exponent and L <
Nonlinear partial differential equations are considered as an essential tool for describing the behavior of many natural phenomena. The modeling of some phenomena requires to work in Sobolev spaces with constant exponent. But for others, such as electrorheological fluids, the properties of classical spaces are not sufficient to have precision. To overcome this difficulty, we work in the appropriate spaces called Lebesgue and Sobolev spaces with variable exponent. In recent works, researchers are attracted by the study of mathematical problems in the context of variable exponent. This great interest is motivated by their applications in many fields such as elastic mechanics, fluid dynamics, and image restoration. In this paper, we combine the technic of monotone operators in Banach spaces and approximation methods to prove the existence of renormalized solutions of a class of nonlinear anisotropic problem involving p ⟶ . − Leray–Lions operator, a graph, and L 1 data. In particular, we establish the uniqueness of the solution when the graph data are considered a strictly increasing function.
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CiteScore
3.10
自引率
0.00%
发文量
20
审稿时长
20 weeks
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