On asymptotic behavior for a class of diffusion equations involving the fractional $$\wp (\cdot )$$ ℘ ( · ) -Laplacian as $$\wp (\cdot )$$ ℘ ( · ) goes to $$\infty $$ ∞

Revista Matemática Complutense Pub Date : 2022-01-31 DOI:10.1007/s13163-021-00419-6

Lauren M. M. Bonaldo, Elard J. Hurtado

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引用次数: 1

Abstract

In this manuscript, we will study the asymptotic behavior for a class of nonlocal diffusion equations associated with the weighted fractional $\wp (\cdot )$-Laplacian operator involving constant/variable exponent, with $\wp ^{-}:=\min _{(x,y) \in {\overline{\Omega }}\times {\overline{\Omega }}} \wp (x,y)\geqslant \max \left\{ 2N/(N+2s),1\right\} $ and $s\in (0,1).$ In the case of constant exponents, under some appropriate conditions, we will study the existence of solutions and asymptotic behavior of solutions by employing the subdifferential approach and we will study the problem when $\wp $ goes to $\infty $. Already, for case the weighted fractional $\wp (\cdot )$-Laplacian operator, we will also study the asymptotic behavior of the problem solution when $\wp (\cdot )$ goes to $\infty $, in the whole or in a subset of the domain (the problem involving the fractional $\wp (\cdot )$-Laplacian presents a discontinuous exponent). To obtain the results of the asymptotic behavior in both problems it will be via Mosco convergence.

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当$$\wp (\cdot )$$ p (p)趋于$$\infty $$∞时，一类涉及分数阶$$\wp (\cdot )$$ p (p)的扩散方程的渐近行为

在本文中，我们将研究一类涉及常/变指数的加权分数阶$\wp (\cdot )$ -拉普拉斯算子的非局部扩散方程的渐近行为，其中$\wp ^{-}:=\min _{(x,y) \in {\overline{\Omega }}\times {\overline{\Omega }}} \wp (x,y)\geqslant \max \left\{ 2N/(N+2s),1\right\} $和$s\in (0,1).$在常指数的情况下，在适当的条件下，我们将利用次微分方法研究解的存在性和解的渐近性，并研究当$\wp $到达$\infty $时的问题。对于加权分数阶$\wp (\cdot )$ -拉普拉斯算子，我们还将研究当$\wp (\cdot )$趋于$\infty $时，在整个或子集中的问题解的渐近行为(涉及分数阶$\wp (\cdot )$ -拉普拉斯算子的问题呈现不连续指数)。为了得到这两个问题的渐近性的结果，将通过Mosco收敛。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Revista Matemática Complutense

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