Asymptotic Behavior for Radially Symmetric Solutions of a Logistic Equation with a Free Boundary

Jingjing Cai Info

Author Name	Affiliation
Jingjing Cai	School of Mathematics and Physics, Shanghai University of Electric Power, Pingliang Road 2103, 200090 Shanghai, China

Quanjun Wu Info

Author Name	Affiliation
Quanjun Wu	School of Mathematics and Physics, Shanghai University of Electric Power, Pingliang Road 2103, 200090 Shanghai, China

DOI: https://doi.org/10.3846/13926292.2017.1258678

Abstract

In this paper we investigate a logistic equation with a new free boundary condition appearing in ecology, we aim to describe the spreading of a new or invasive species by studying the asymptotic behavior of the radially symmetric solutions of the problem. We will obtain a trichotomy result: spreading (the solution converges to a stationary solution defined on the half–line), transition (the solution converges to a stationary solution with compact support) and vanishing (the solution converges to 0 within a finite time). Besides we can also obtain a dichotomy result (either spreading or vanishing happens). Moreover, in the spreading case, we give the sharp estimate of the asymptotic spreading speed of the free boundary.

Keywords:

asymptotic behavior of solutions, logistic equation, free boundary, trichotomy result