Adhesion and volume filling in one-dimensional population dynamics under Dirichlet boundary condition

Hyung Jun Choi, Seonghak Kim, Youngwoo Koh
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引用次数: 0

Abstract

We generalize the one-dimensional population model of Anguige & Schmeiser [1] reflecting the cell-to-cell adhesion and volume filling and classify the resulting equation into the six types. Among these types, we fix one that yields a class of advection-diffusion equations of forward-backward-forward type and prove the existence of infinitely many global-in-time weak solutions to the initial-Dirichlet boundary value problem when the maximum value of an initial population density exceeds a certain threshold. Such solutions are extracted from the method of convex integration by Müller & Šverák [12]; they exhibit fine-scale density mixtures over a finite time interval, then become smooth and identical, and decay exponentially and uniformly to zero as time approaches infinity. TE check: Please check the reference citation in abstract.

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迪里夏特边界条件下一维种群动力学中的粘附和体积填充
我们对 Anguige & Schmeiser [1] 的一维种群模型进行了概括,反映了细胞间的粘附和体积填充,并将由此产生的方程分为六种类型。在这些类型中,我们将其中一种固定下来,得到了一类前向-后向-前向型的平流-扩散方程,并证明了当初始种群密度的最大值超过某个临界值时,存在无穷多个全局-时间弱解的初始-Dirichlet 边界值问题。这些解是从 Müller & Šverák [12] 的凸积分法中提取出来的;它们在有限的时间间隔内表现出细尺度的密度混合物,然后变得平滑和相同,并随着时间接近无穷大而指数式地均匀衰减为零。TE 检查:请检查摘要中的参考文献。
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来源期刊
CiteScore
3.00
自引率
0.00%
发文量
72
审稿时长
6-12 weeks
期刊介绍: A flagship publication of The Royal Society of Edinburgh, Proceedings A is a prestigious, general mathematics journal publishing peer-reviewed papers of international standard across the whole spectrum of mathematics, but with the emphasis on applied analysis and differential equations. An international journal, publishing six issues per year, Proceedings A has been publishing the highest-quality mathematical research since 1884. Recent issues have included a wealth of key contributors and considered research papers.
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