Wang, Rong; Du, Yihong

Author(s)

Wang, Rong

Du, Yihong

Publication Date

2023

Abstract

This paper is a sequel to Wang and Du [15], on the long-time dynamics of an epidemic model whose diffusion and reaction terms involve nonlocal effects described by suitable convolution operators, and the spreading front is represented by the free boundaries in the model. In [15], it was shown that the model is well-posed, and its long-time dynamical behaviour is governed by a spreading-vanishing dichotomy; however, the spreading speed was not determined. In this paper, we completely determine the spreading speed of the model when spreading happens. We find a threshold condition for the diffusion kernels J1 and J2 such that the asymptotic spreading speed is finite precisely when this condition is satisfied. Moreover, this speed is determined by a unique semi-wave solution which exists exactly when this threshold condition holds. When this condition is not satisfied, and spreading is successful, we prove that the asymptotic spreading speed is infinite, namely accelerated spreading happens.

Citation

Discrete and Continuous Dynamical Systems, 43(1), p. 121-161

ISSN

1553-5231

1078-0947

Link

https://hdl.handle.net/1959.11/63250

Publisher

Amer Inst Mathematical Sciences-Aims

Title

Long-time Dynamics Of An Epidemic Model With Nonlocal Diffusion And Free Boundaries: Spreading Speed

Type of document

Journal Article

Entity Type

Publication

Author(s)	Wang, Rong Du, Yihong
Publication Date	2023
Abstract	This paper is a sequel to Wang and Du [15], on the long-time dynamics of an epidemic model whose diffusion and reaction terms involve nonlocal effects described by suitable convolution operators, and the spreading front is represented by the free boundaries in the model. In [15], it was shown that the model is well-posed, and its long-time dynamical behaviour is governed by a spreading-vanishing dichotomy; however, the spreading speed was not determined. In this paper, we completely determine the spreading speed of the model when spreading happens. We find a threshold condition for the diffusion kernels J1 and J2 such that the asymptotic spreading speed is finite precisely when this condition is satisfied. Moreover, this speed is determined by a unique semi-wave solution which exists exactly when this threshold condition holds. When this condition is not satisfied, and spreading is successful, we prove that the asymptotic spreading speed is infinite, namely accelerated spreading happens.
Citation	Discrete and Continuous Dynamical Systems, 43(1), p. 121-161
ISSN	1553-5231 1078-0947
Link	https://hdl.handle.net/1959.11/63250
Publisher	Amer Inst Mathematical Sciences-Aims
Title	Long-time Dynamics Of An Epidemic Model With Nonlocal Diffusion And Free Boundaries: Spreading Speed
Type of document	Journal Article
Entity Type	Publication

Long-time Dynamics Of An Epidemic Model With Nonlocal Diffusion And Free Boundaries: Spreading Speed

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