[[abstract]]We study traveling wave solutions for a lattice dynamical system with convolution type nonlinearity. We consider the monostable case and discuss the asymptotic behaviors, monotonicity and uniqueness of traveling wave. First, we characterize the asymptotic behavior of wave profile at both wave tails. Next, we prove that any wave profile is strictly decreasing. Finally, we prove the uniqueness (up to translation) of wave profile for each given admissible wave speed.[[journaltype]]國外[[incitationindex]]SCI[[booktype]]紙本[[countrycodes]]US
This paper is concerned with a lattice dynamical system modeling the evolution of susceptible and in...
AbstractThis work proves the existence and multiplicity results of monotonic traveling wave solution...
[[abstract]]We study the existence of traveling wave front solutions for a three species competition...
Abstract. We study the traveling waves for a lattice dynamical system with monostable non-linearity ...
[[abstract]]We study traveling waves for a two-dimensional lattice dynamical system with monostable ...
AbstractWe study the traveling waves for a lattice dynamical system with monostable nonlinearity in ...
We study traveling waves for a two-dimensional lattice dynamical system with bistable nonlinearity i...
[[abstract]]In this thesis, we study a two-component competition system in one dimensional lattice i...
Abstract. Established here is the uniquenes of solutions for the traveling wave problem cU ′(x) = U(...
Abstract. We study the traveling wave front solutions for a two-dimensional periodic lattice dynamic...
AbstractIn this paper, we study the existence and stability of traveling waves in lattice dynamical ...
AbstractWe study traveling front solutions for a two-component system on a one-dimensional lattice. ...
[[abstract]]We study traveling front solutions for a two-component system on a one-dimensional latti...
[[abstract]]In this series of lectures, we shall discuss the traveling front solutions for a lattice...
[[abstract]]We study the stability and uniqueness of nonzero speed traveling waves for a three-compo...
This paper is concerned with a lattice dynamical system modeling the evolution of susceptible and in...
AbstractThis work proves the existence and multiplicity results of monotonic traveling wave solution...
[[abstract]]We study the existence of traveling wave front solutions for a three species competition...
Abstract. We study the traveling waves for a lattice dynamical system with monostable non-linearity ...
[[abstract]]We study traveling waves for a two-dimensional lattice dynamical system with monostable ...
AbstractWe study the traveling waves for a lattice dynamical system with monostable nonlinearity in ...
We study traveling waves for a two-dimensional lattice dynamical system with bistable nonlinearity i...
[[abstract]]In this thesis, we study a two-component competition system in one dimensional lattice i...
Abstract. Established here is the uniquenes of solutions for the traveling wave problem cU ′(x) = U(...
Abstract. We study the traveling wave front solutions for a two-dimensional periodic lattice dynamic...
AbstractIn this paper, we study the existence and stability of traveling waves in lattice dynamical ...
AbstractWe study traveling front solutions for a two-component system on a one-dimensional lattice. ...
[[abstract]]We study traveling front solutions for a two-component system on a one-dimensional latti...
[[abstract]]In this series of lectures, we shall discuss the traveling front solutions for a lattice...
[[abstract]]We study the stability and uniqueness of nonzero speed traveling waves for a three-compo...
This paper is concerned with a lattice dynamical system modeling the evolution of susceptible and in...
AbstractThis work proves the existence and multiplicity results of monotonic traveling wave solution...
[[abstract]]We study the existence of traveling wave front solutions for a three species competition...