We discuss models for coupled wave equations describing interacting fields, focusing on the speed of travelling wave solutions. In particular, we propose a general mechanism for selecting and tuning the speed of the corresponding (multi-component) travelling wave solutions under certain physical conditions. A number of physical models (molecular chains, coupled Josephson junctions, propagation of kinks in chains of adsorbed atoms and domain walls) are considered as examples
In this paper the wave propagation dynamics of a Lotka-Volterra type of model with cubic competition...
We derive conditions for the existence of traveling wave solutions in a chain of pulse-coupled integ...
Abstract:- In this work we numerically investigate the behaviour of travelling wave solutions of PDE...
We discuss models for coupled wave equations describing interacting fields, focusing on the speed of...
In this paper, the invasive speed selection of the monostable travelling wave for a three-component ...
We investigate the phenomenon of velocity selection for traveling wave fronts in a class of coupled-...
We discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial different...
We discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial different...
Within the framework of the Maxwell-Cattaneo relaxation model extended to reaction-diffusion systems...
In this paper, we consider the speed selection problem of the scalar reaction-diffusion equations an...
We consider a coupled reaction–advection–diffusion system based on the Fisher-KPP and Burgers equati...
We revisit the classical problem of speed selection for the propagation of disturbances in scalar re...
AbstractWe discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial d...
In this paper we construct a simple mathematical model for infectious disease in a pradator-prey sys...
We consider kinetic and associated macroscopic equations on networks. The general approach will be e...
In this paper the wave propagation dynamics of a Lotka-Volterra type of model with cubic competition...
We derive conditions for the existence of traveling wave solutions in a chain of pulse-coupled integ...
Abstract:- In this work we numerically investigate the behaviour of travelling wave solutions of PDE...
We discuss models for coupled wave equations describing interacting fields, focusing on the speed of...
In this paper, the invasive speed selection of the monostable travelling wave for a three-component ...
We investigate the phenomenon of velocity selection for traveling wave fronts in a class of coupled-...
We discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial different...
We discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial different...
Within the framework of the Maxwell-Cattaneo relaxation model extended to reaction-diffusion systems...
In this paper, we consider the speed selection problem of the scalar reaction-diffusion equations an...
We consider a coupled reaction–advection–diffusion system based on the Fisher-KPP and Burgers equati...
We revisit the classical problem of speed selection for the propagation of disturbances in scalar re...
AbstractWe discuss traveling wave solutions to the Yukawa equations, a system of nonlinear partial d...
In this paper we construct a simple mathematical model for infectious disease in a pradator-prey sys...
We consider kinetic and associated macroscopic equations on networks. The general approach will be e...
In this paper the wave propagation dynamics of a Lotka-Volterra type of model with cubic competition...
We derive conditions for the existence of traveling wave solutions in a chain of pulse-coupled integ...
Abstract:- In this work we numerically investigate the behaviour of travelling wave solutions of PDE...