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Main Author: Zhang, Zexin
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.12401
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author Zhang, Zexin
author_facet Zhang, Zexin
contents In this paper, we investigate the uniform regularity and asymptotic behavior of solutions to the following Lotka-Volterra type system of strong competition with Dirichlet boundary conditions: \begin{align*} \left\{ \begin{array}{ll} -Δu_{i,β} = f_{i,β}(x, u_{i,β}) - βu_{i,β}^{p_i} \sum_{\substack{j=1 \\ j \neq i}}^k a_{ij} u_{j,β}^{p_j}, \quad u_{i,β} > 0 & \text{in } Ω, u_{i,β} = φ_{i,β} & \text{on } \partialΩ, \end{array}\right. \end{align*} where $N \geq 1$, $1 \leq i \leq k$ with $k \geq 3$, $β> 0$, $p_i \geq 1$, $a_{ij} > 0$ for $i \neq j$, and $Ω$ is a $C^{1,\text{Dini}}$ bounded domain in $\mathbb{R}^N$. First, we prove that the uniform boundedness of the solutions implies their uniform interior and global Lipschitz boundedness as $β\to +\infty$. Such uniform results are optimal; partial versions thereof are known in the literature for symmetric coefficients (i.e., $a_{ij} = a_{ji}$ for all $i \neq j$) and homogeneous competition terms (i.e., $p_i = p_j$ for all $i\neq j$). Here, we establish an Alt-Caffarelli-Friedman type monotonicity formula for the system and then employ blow-up analysis to show that these results also hold in the asymmetric or nonhomogeneous case. Next, as consequences of the uniform optimal regularity, we derive sharp quantitative pointwise estimates for the densities near the interface between different components.
format Preprint
id arxiv_https___arxiv_org_abs_2511_12401
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Optimal uniform regularity and asymptotic behavior of solutions to Lotka-Volterra type systems with strong competition and asymmetric coefficients
Zhang, Zexin
Analysis of PDEs
35J57, 35B40, 35B44, 35B09
In this paper, we investigate the uniform regularity and asymptotic behavior of solutions to the following Lotka-Volterra type system of strong competition with Dirichlet boundary conditions: \begin{align*} \left\{ \begin{array}{ll} -Δu_{i,β} = f_{i,β}(x, u_{i,β}) - βu_{i,β}^{p_i} \sum_{\substack{j=1 \\ j \neq i}}^k a_{ij} u_{j,β}^{p_j}, \quad u_{i,β} > 0 & \text{in } Ω, u_{i,β} = φ_{i,β} & \text{on } \partialΩ, \end{array}\right. \end{align*} where $N \geq 1$, $1 \leq i \leq k$ with $k \geq 3$, $β> 0$, $p_i \geq 1$, $a_{ij} > 0$ for $i \neq j$, and $Ω$ is a $C^{1,\text{Dini}}$ bounded domain in $\mathbb{R}^N$. First, we prove that the uniform boundedness of the solutions implies their uniform interior and global Lipschitz boundedness as $β\to +\infty$. Such uniform results are optimal; partial versions thereof are known in the literature for symmetric coefficients (i.e., $a_{ij} = a_{ji}$ for all $i \neq j$) and homogeneous competition terms (i.e., $p_i = p_j$ for all $i\neq j$). Here, we establish an Alt-Caffarelli-Friedman type monotonicity formula for the system and then employ blow-up analysis to show that these results also hold in the asymmetric or nonhomogeneous case. Next, as consequences of the uniform optimal regularity, we derive sharp quantitative pointwise estimates for the densities near the interface between different components.
title Optimal uniform regularity and asymptotic behavior of solutions to Lotka-Volterra type systems with strong competition and asymmetric coefficients
topic Analysis of PDEs
35J57, 35B40, 35B44, 35B09
url https://arxiv.org/abs/2511.12401