Turing instability analysis of a singular cross-diffusion problem

Date

2021-06-21

Authors

Galiano, Gonzalo
González Tabernero, Víctor

Journal Title

Journal ISSN

Volume Title

Publisher

Texas State University, Department of Mathematics

Abstract

The population model by Busenberg and Travis is a paradigmatic model in ecology and tumor modeling because its ability to capture interesting phenomena such as segregation of populations. Its singular mathematical structure enforces the consideration of regularized problems to deduce properties as fundamental as the existence of solutions. In this article we perform a weakly nonlinear stability analysis of a general class of regularized problems to study the convergence of the instability modes in the limit of the regularization parameter. We demonstrate with some specific examples that the pattern formation observed in the regularized problems, with unbounded wave numbers, is not present in the limit problem because of the amplitude decay of the oscillations. We also check the results of the stability analysis with direct finite element simulations of the problem.

Description

Keywords

Cross-diffusion, Turing instability, Weakly nonlinear equation, Finite element method

Citation

Galiano, G., & González-Tabernero, V. (2021). Turing instability analysis of a singular cross-diffusion problem. <i>Electronic Journal of Differential Equations, 2021</i>(55), pp. 1-17.

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Attribution 4.0 International

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This work is licensed under a Creative Commons Attribution 4.0 International License.

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