Kinks and solitons in linear and nonlinear-diffusion Keller-Segel type models with logarithmic sensitivity


Abstract in English

This paper deals with the existence of traveling waves type patterns in the case of the Keller-Segel model with logarithmic sensitivity. The cases in which the diffusion is linear and nonlinear with flux-saturated (of the relativistic heat equation-type) are fully analyzed by comparing the difference between both cases. Moreover, special attention is paid to traveling waves with compact support or with support in the semi-straight line. The existence of these patterns is rigorously proved and the differences between both cases (linear or nonlinear diffusion) are analyzed.

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