Wave propagation for a reaction–diffusion model with a quiescent stage on a 2D spatial lattice

In this paper, we study the traveling wave fronts of a delayed reaction-diffusion system with a quiescent stage for a single species population with two separate mobile and stationary states. By transforming the corresponding wave system into a scalar delayed differential equation with an integral t

## Abstract Cabeceira et al. recently presented a time‐domain analysis of wave propagation in a Tellegen medium [1]. Their analysis is ill‐founded because (i) the existence of any Tellegen medium is not tenable within modern electromagnetic theory; and (ii) the constitutive relations employed are n

This paper is concerned with the propagation speed of positive travelling waves for a Lotka᎐Volterra competition model with diffusion. We show that under a certain boundary condition, the propagation speed of the travelling wave is equal to 0. To do this, we employ the method of moving planes propos