摘要: In this work, we investigate the existence of increasing travelling wave solutions for a class of delayed lattice reaction-diffusion systems. The systems arise from various epidemic and biological models. Instead of using the monotone iteration technique, in this article we first consider a sequence of truncated problems and obtain increasing solutions of the truncated problems. Then, combining solutions of the truncated problems with positive super-solutions of the reaction-diffusion systems and using Helly's convergence lemma, we establish the existence of increasing travelling wave solutions. Moreover, for different non-linearities, we provide some necessary conditions of wave speed for the existence of travelling wave solutions and apply our results to several models. 出版日期: 2015-04-01 出處: IMA journal of applied mathematics, 2015-04, Vol.80 (2), p.302-323 識別號: ISSN: 0272-4960 識別號: EISSN: 1464-3634 識別號: DOI: 10.1093/imamat/hxt039
