Global boundedness and asymptotic behavior of the chemotaxis system for alopecia areata with singular sensitivity

IF 1.4 Q2 MATHEMATICS, APPLIED Results in Applied Mathematics Pub Date : 2024-04-06 DOI:10.1016/j.rinam.2024.100450

Peng Gao , Lu Xu

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Abstract

This paper is concerned with a three-component chemotaxis system for alopecia areata with singular sensitivity $(\begin{matrix} u_{t} = Δ u - χ_{1} \nabla \cdot (\frac{u}{w} \nabla w) + w - μ_{1} u^{2}, & x \in Ω, t > 0, \\ v_{t} = Δ v - χ_{2} \nabla \cdot (\frac{v}{w} \nabla w) + w + r u v - μ_{2} v^{2}, & x \in Ω, t > 0, \\ w_{t} = Δ w + u + v - w, & x \in Ω, t > 0, \\ \frac{\partial u}{\partial ν} = \frac{\partial v}{\partial ν} = \frac{\partial w}{\partial ν} = 0, & x \in \partial Ω, t > 0, \\ u (x, 0) = u_{0} (x), v (x, 0) = v_{0} (x), w (x, 0) = w_{0} (x), & x \in Ω \end{matrix})$ under the homogeneous Neumann boundary conditions in a smoothly bounded domain $Ω \subset R^{2}$ , where the parameters $χ_{i}$ , $μ_{i}$ $(i = 1, 2)$ and $r$ are positive. It is showed that if $χ_{1}, χ_{2} < \frac{\sqrt{5}}{2}$ , this system admits a globally bounded classical solution. Furthermore, under the particular conditions of $μ_{1} < μ_{2} < 3 μ_{1}$ and $r = μ_{2} - μ_{1}$ , the global bounded solution converges to the steady state $(\frac{2}{μ_{1}}, \frac{2}{μ_{1}}, \frac{4}{μ_{1}})$ as $t \to \infty$ .

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具有奇异敏感性的脱发症趋化系统的全局有界性和渐近行为

本文研究的是一种用于治疗斑秃的三组份趋化系统，其奇异敏感度为 ut=Δu-χ1∇⋅uw∇w+w-μ1u2,x∈Ω,t>；0,vt=Δv-χ2∇⋅vw∇w+w+ruv-μ2v2,x∈Ω,t>0,wt=Δw+u+v-w,x∈Ω,t>；0,∂u∂ν=∂v∂ν=∂w∂ν=0,x∈∂Ω,t>；0,u(x,0)=u0(x),v(x,0)=v0(x),w(x,0)=w0(x),x∈Ω在平滑有界域Ω⊂R2 中的均相 Neumann 边界条件下，其中参数 χi、μi（i=1,2）和 r 均为正值。研究表明，如果χ1,χ2<52，这个系统会有一个全局有界的经典解。此外，在μ1<μ2<3μ1和r=μ2-μ1的特定条件下，随着t→∞，全局有界解收敛到稳态（2μ1,2μ1,4μ1）。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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