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Main Authors: Tran, Bao-Ngoc, Yang, Juan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2508.03268
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author Tran, Bao-Ngoc
Yang, Juan
author_facet Tran, Bao-Ngoc
Yang, Juan
contents Motivated by the study of bacteria's response to environmental conditions, we consider the doubly degenerate nutrient taxis system \begin{align*} \begin{cases} u_t=\nabla\cdot(uv\nabla u)-χ\nabla\cdot(u^αv\nabla v)+\ell uv,\\ v_t=Δv-uv, \end{cases} \end{align*} subjected to no-flux boundary conditions and smooth initial data, where $α\in\mathbb{R}$ is the bacterial response parameter. Global solvability of weak solutions to this taxis system is highly challenging due to not only the doubly nonlinear diffusion and its degeneracy but also the strong chemotactic effect, where the latter is strong at the large species density if $α$ is close to $2$. Recent findings on the global weak solvability for the considered system are summarised as follows \begin{itemize} \item In [M. Winkler, \textit{Trans. Amer. Math. Soc.}, 2021] for $α=2$, $N=1$; \item In [M. Winkler, \textit{J. Differ. Equ.}, 2024] for $1\leα\le 2$, $N=2$ with initial data of small size if $α=2$; \item In [Z. Zhang and Y. Li, \textit{arXiv:2405.20637}, 2024] for $α=2$, $N=2$; and \item In [G. Li, \textit{J. Differ. Equ.}, 2022] for $\frac{7}{6}<α<\frac{13}{9}$, $N=3$. \end{itemize} Our work aims to provide a picture of global weak solvability for $0\leα<2$ in the physically dimensional setting $N=3$. As suggested by the analysis, it is divided into three separable cases, including (i) $0\leα\le 1$: Weak chemotaxis effect; (ii) $1<α\le 3/2$: Moderate chemotaxis effect; and (iii) $3/2<α<2$: Strong chemotaxis effect.
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Global solvability for doubly degenerate nutrient taxis system with a wide range of bacterial responses in physical dimension
Tran, Bao-Ngoc
Yang, Juan
Analysis of PDEs
Motivated by the study of bacteria's response to environmental conditions, we consider the doubly degenerate nutrient taxis system \begin{align*} \begin{cases} u_t=\nabla\cdot(uv\nabla u)-χ\nabla\cdot(u^αv\nabla v)+\ell uv,\\ v_t=Δv-uv, \end{cases} \end{align*} subjected to no-flux boundary conditions and smooth initial data, where $α\in\mathbb{R}$ is the bacterial response parameter. Global solvability of weak solutions to this taxis system is highly challenging due to not only the doubly nonlinear diffusion and its degeneracy but also the strong chemotactic effect, where the latter is strong at the large species density if $α$ is close to $2$. Recent findings on the global weak solvability for the considered system are summarised as follows \begin{itemize} \item In [M. Winkler, \textit{Trans. Amer. Math. Soc.}, 2021] for $α=2$, $N=1$; \item In [M. Winkler, \textit{J. Differ. Equ.}, 2024] for $1\leα\le 2$, $N=2$ with initial data of small size if $α=2$; \item In [Z. Zhang and Y. Li, \textit{arXiv:2405.20637}, 2024] for $α=2$, $N=2$; and \item In [G. Li, \textit{J. Differ. Equ.}, 2022] for $\frac{7}{6}<α<\frac{13}{9}$, $N=3$. \end{itemize} Our work aims to provide a picture of global weak solvability for $0\leα<2$ in the physically dimensional setting $N=3$. As suggested by the analysis, it is divided into three separable cases, including (i) $0\leα\le 1$: Weak chemotaxis effect; (ii) $1<α\le 3/2$: Moderate chemotaxis effect; and (iii) $3/2<α<2$: Strong chemotaxis effect.
title Global solvability for doubly degenerate nutrient taxis system with a wide range of bacterial responses in physical dimension
topic Analysis of PDEs
url https://arxiv.org/abs/2508.03268