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Autores principales: Mészáros, Alpár R., Parker, Guy
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2603.18770
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author Mészáros, Alpár R.
Parker, Guy
author_facet Mészáros, Alpár R.
Parker, Guy
contents We consider a cross-diffusion system for which the diffusion of each species is governed solely by the aggregate density through a pressure law of logarithmic or fast diffusion type. The model is set over a one dimensional bounded interval, equipped with no-flux boundary conditions, and accommodates for the presence of potential drifts which are allowed to differ across each species. We establish the global existence of solutions without having to assume the total mixing of solutions. As a consequence, we give a full resolution of the PDE systems recently studied by the authors and by Elbar--Santambrogio, by allowing a general class of initial data with finite bounded variation, with no further structural assumptions on their supports.
format Preprint
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institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Existence Theory for a Cross-Diffusion System with Independent Drifts: Mixing Dynamics
Mészáros, Alpár R.
Parker, Guy
Analysis of PDEs
We consider a cross-diffusion system for which the diffusion of each species is governed solely by the aggregate density through a pressure law of logarithmic or fast diffusion type. The model is set over a one dimensional bounded interval, equipped with no-flux boundary conditions, and accommodates for the presence of potential drifts which are allowed to differ across each species. We establish the global existence of solutions without having to assume the total mixing of solutions. As a consequence, we give a full resolution of the PDE systems recently studied by the authors and by Elbar--Santambrogio, by allowing a general class of initial data with finite bounded variation, with no further structural assumptions on their supports.
title Existence Theory for a Cross-Diffusion System with Independent Drifts: Mixing Dynamics
topic Analysis of PDEs
url https://arxiv.org/abs/2603.18770