Existence and metastability of non-constant steady states in a Keller-Segel model with density-suppressed motility

Peng Xia; Yazhou Han; Jicheng Tao; Manjun Ma

doi:10.5206/mase/8120

Mathematics in Applied Sciences and Engineering (Sep 2019)

Existence and metastability of non-constant steady states in a Keller-Segel model with density-suppressed motility

Peng Xia,
Yazhou Han,
Jicheng Tao,
Manjun Ma

Affiliations

Peng Xia: Zhejiang Sci-Tech University
Yazhou Han: China Jiliang University
Jicheng Tao: China Jiliang University
Manjun Ma: Zhejiang Sci-Tech University

DOI: https://doi.org/10.5206/mase/8120
Journal volume & issue: Vol. 1, no. 1
pp. 1 – 15

Abstract

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We are concerned with stationary solutions of a Keller-Segel Model with density-suppressed motility and without cell proliferation. we establish the existence and the analytical approximation of non-constant stationary solutions by applying the phase plane analysis and bifurcation analysis. We show that the one-step solutions is stable and two or more-step solutions are always unstable. Then we further show that two or more-step solutions possess metastability. Our analytical results are corroborated by direct simulations of the underlying system.

a keller-segel model, density-suppressed motility, metastability, nonconstant steady states

Published in Mathematics in Applied Sciences and Engineering

ISSN: 2563-1926 (Online)
Publisher: Western Libraries
Country of publisher: Canada
LCC subjects: Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods
Website: https://ojs.lib.uwo.ca/index.php/mase/index

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