双指数对数抛物方程的单调正径向解法

IF 3.6 2区数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Fractal and Fractional Pub Date : 2024-03-16 DOI:10.3390/fractalfract8030173

Mengru Liu, Lihong Zhang

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引用次数: 0

摘要

本文主要研究双指数对数非线性分数 g-Laplacian 抛物方程与 Marchaud 分数时间导数 ∂tα。与经典的直接移动平面法相比，为了克服时空的双重非位置性和分数 g-Laplacian 的非线性所带来的挑战，我们建立了无界窄域原理，为移动平面法提供了一个起点。同时，为了消除解的有界性假设，我们建立了非局部算子的平均效应；然后，将这些平均效应应用两次，以确保平面可以连续地向无穷大方向移动。在此基础上，研究了上述分数 g-Laplacian 抛物方程正解的单调性。

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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Monotone Positive Radial Solution of Double Index Logarithm Parabolic Equations

This article mainly studies the double index logarithmic nonlinear fractional g-Laplacian parabolic equations with the Marchaud fractional time derivatives ∂tα. Compared with the classical direct moving plane method, in order to overcome the challenges posed by the double non-locality of space-time and the nonlinearity of the fractional g-Laplacian, we establish the unbounded narrow domain principle, which provides a starting point for the moving plane method. Meanwhile, for the purpose of eliminating the assumptions of boundedness on the solutions, the averaging effects of a non-local operator are established; then, these averaging effects are applied twice to ensure that the plane can be continuously moved toward infinity. Based on the above, the monotonicity of a positive solution for the above fractional g-Laplacian parabolic equations is studied.

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来源期刊

Fractal and Fractional MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-

CiteScore

4.60

自引率

18.50%

发文量

632

审稿时长

11 weeks

期刊介绍： Fractal and Fractional is an international, scientific, peer-reviewed, open access journal that focuses on the study of fractals and fractional calculus, as well as their applications across various fields of science and engineering. It is published monthly online by MDPI and offers a cutting-edge platform for research papers, reviews, and short notes in this specialized area. The journal, identified by ISSN 2504-3110, encourages scientists to submit their experimental and theoretical findings in great detail, with no limits on the length of manuscripts to ensure reproducibility. A key objective is to facilitate the publication of detailed research, including experimental procedures and calculations. "Fractal and Fractional" also stands out for its unique offerings: it warmly welcomes manuscripts related to research proposals and innovative ideas, and allows for the deposition of electronic files containing detailed calculations and experimental protocols as supplementary material.