Translator Disclaimer
May/June 2021 Nonplanar traveling fronts for nonlocal dispersal equations with bistable nonlinearity
Wan-Tong Li, Hong-Tao Niu, Zhi-Cheng Wang
Differential Integral Equations 34(5/6): 265-294 (May/June 2021).

Abstract

This paper is concerned with nonplanar traveling fronts for a class of nonlocal dispersal equations with bistable nonlinearity. A comparison principle is introduced and employed to establish the existence of traveling fronts with pyramidal shape in $\mathbb R^3$. Although the speed of the pyramidal traveling fronts is not unique, their global average speed is unique. This is possibly the first time that the nonplanar traveling waves for the nonlocal dispersal equations has been studied.

Citation

Download Citation

Wan-Tong Li. Hong-Tao Niu. Zhi-Cheng Wang. "Nonplanar traveling fronts for nonlocal dispersal equations with bistable nonlinearity." Differential Integral Equations 34 (5/6) 265 - 294, May/June 2021.

Information

Published: May/June 2021
First available in Project Euclid: 15 April 2021

Subjects:
Primary: 35C07 , 35K57 , 45K05

Rights: Copyright © 2021 Khayyam Publishing, Inc.

JOURNAL ARTICLE
30 PAGES

This article is only available to subscribers.
It is not available for individual sale.
+ SAVE TO MY LIBRARY

SHARE
Vol.34 • No. 5/6 • May/June 2021
Back to Top