The uniqueness of indefinite nonlinear diffusion problem in population genetics, part I

被引：11

作者：

Nakashima, Kimie ^{[1
]}

机构：

[1] Tokyo Univ Marine Sci & Technol, Minato Ku, 4-5-7 Kounan, Tokyo 1088477, Japan

来源：

JOURNAL OF DIFFERENTIAL EQUATIONS | 2016年 / 261卷 / 11期

关键词：

Reaction diffusion equation; Singular perturbation; Layers; MIGRATION; SELECTION; EXISTENCE;

D O I：

10.1016/j.jde.2016.08.041

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We study the following Neumann problem in one dimension. {u(t) = du '' + g(x)u(2) (1 - u) in (0,1) x (0, infinity), 0 <= u <= 1 in (0,1) x (0, infinity), u'(0, t) = u'(1, t) = 0 in (0, infinity), g changes sign in (0, 1). This equation models the "complete dominance" case in population genetics of two alleles. It is known that this equation has a nontrivial steady state u(d) for d sufficiently small. We show that the steady state ud is linearly stable. Moreover, under the condition integral(1)(0) g(x) dx >= 0, we show that ud is a unique nontrivial steady state. A conjecture of Nagylaki and Lou in one dimensional case has been largely resolved. (C) 2016 Elsevier Inc. All rights reserved.

引用

页码：6233 / 6282

页数：50

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