On Cauchy problem for fractional parabolic-elliptic Keller-Segel model

IF 3.2 1区数学 Q1 MATHEMATICS

Advances in Nonlinear Analysis Pub Date : 2022-08-22 DOI:10.1515/anona-2022-0256

A. Nguyen, N. Tuan, Chao Yang

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引用次数: 16

Abstract

Abstract In this paper, we concern about a modified version of the Keller-Segel model. The Keller-Segel is a system of partial differential equations used for modeling Chemotaxis in which chemical substances impact the movement of mobile species. For considering memory effects on the model, we replace the classical derivative with respect to time variable by the time-fractional derivative in the sense of Caputo. From this modification, we focus on the well-posedness of the Cauchy problem associated with such the model. Precisely, when the spatial variable is considered in the space R d {{\mathbb{R}}}^{d} , a global solution is obtained in a critical homogeneous Besov space with the assumption that the initial datum is sufficiently small. For the bounded domain case, by using a discrete spectrum of the Neumann Laplace operator, we provide the existence and uniqueness of a mild solution in Hilbert scale spaces. Moreover, the blowup behavior is also studied. To overcome the challenges of the problem and obtain all the aforementioned results, we use the Banach fixed point theorem, some special functions like the Mainardi function and the Mittag-Leffler function, as well as their properties.

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分数阶抛物-椭圆Keller-Segel模型的Cauchy问题

在本文中，我们关注的是Keller-Segel模型的一个修正版本。Keller-Segel是一个偏微分方程系统，用于模拟化学趋向性，其中化学物质影响流动物种的运动。为了考虑模型的记忆效应，我们用卡普托意义上的时间分数阶导数代替了经典的关于时间变量的导数。在此基础上，重点讨论了与该模型相关的柯西问题的适定性。精确地说，当空间变量在空间R d {{\mathbb{R}}}^{d}中考虑时，假设初始基准足够小，在临界齐次Besov空间中得到全局解。对于有界域情况，利用Neumann Laplace算子的离散谱，给出了Hilbert尺度空间中温和解的存在唯一性。此外，还研究了爆破行为。为了克服问题的挑战并获得上述所有结果，我们使用了Banach不动点定理，以及Mainardi函数和Mittag-Leffler函数等特殊函数及其性质。

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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来源期刊

Advances in Nonlinear Analysis MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

6.00

自引率

9.50%

发文量

审稿时长

30 weeks

期刊介绍： Advances in Nonlinear Analysis (ANONA) aims to publish selected research contributions devoted to nonlinear problems coming from different areas, with particular reference to those introducing new techniques capable of solving a wide range of problems. The Journal focuses on papers that address significant problems in pure and applied nonlinear analysis. ANONA seeks to present the most significant advances in this field to a wide readership, including researchers and graduate students in mathematics, physics, and engineering.