Add to ORKGIn this article, we study the solutions of a nonlocal dispersal equation with a spatial weight representing competitions and aggregation. To overcome the limitations of comparison principles, we introduce new definitions of upper-lower solutions. The proof of existence and uniqueness of positive solutions is based on the method of monotone iteration sequences
Reaction-diffusion equations have several applications in the feld of population dynamics and some o...
The scalar initial value problem ut = ρDu+ f(u), is a model for dispersal. Here u represents the den...
Reaction-diffusion equations have several applications in the field of population dynamics and some ...
AbstractThis paper is concerned with a nonlocal evolution equation which is used to model the spatia...
AbstractThis article in devoted to the study of the nonlocal dispersal equationut(x,t)=∫RJ(x−yg(y))u...
In this work we studied a nonlocal spatial model on continuous time and space. Based on Levins’ meta...
AbstractThis paper is concerned with a nonlocal evolution equation which is used to model the spatia...
Abstract. This paper deals with positive stationary solutions and spreading speeds of monostable equ...
Artículo de publicación ISIIn this paper we study the asymptotic behavior of the following nonlocal ...
Artículo de publicación ISIIn this paper we study the asymptotic behavior of the following nonlocal ...
We study the dynamics of classical solutions of a two-stage structured population model with nonloca...
We study a model for a structured population with a two-phase life cycle. Growth and reproduction oc...
International audienceIn this paper, we analyse the structure of the set of positive solutions of an...
In this article, we analyse the non-local model: ∂u ∂t = J ⋆ u − u+ f(x, u) with x ∈ RN, where J is ...
Reaction-diffusion equations have several applications in the feld of population dynamics and some o...
Reaction-diffusion equations have several applications in the feld of population dynamics and some o...
The scalar initial value problem ut = ρDu+ f(u), is a model for dispersal. Here u represents the den...
Reaction-diffusion equations have several applications in the field of population dynamics and some ...
AbstractThis paper is concerned with a nonlocal evolution equation which is used to model the spatia...
AbstractThis article in devoted to the study of the nonlocal dispersal equationut(x,t)=∫RJ(x−yg(y))u...
In this work we studied a nonlocal spatial model on continuous time and space. Based on Levins’ meta...
AbstractThis paper is concerned with a nonlocal evolution equation which is used to model the spatia...
Abstract. This paper deals with positive stationary solutions and spreading speeds of monostable equ...
Artículo de publicación ISIIn this paper we study the asymptotic behavior of the following nonlocal ...
Artículo de publicación ISIIn this paper we study the asymptotic behavior of the following nonlocal ...
We study the dynamics of classical solutions of a two-stage structured population model with nonloca...
We study a model for a structured population with a two-phase life cycle. Growth and reproduction oc...
International audienceIn this paper, we analyse the structure of the set of positive solutions of an...
In this article, we analyse the non-local model: ∂u ∂t = J ⋆ u − u+ f(x, u) with x ∈ RN, where J is ...
Reaction-diffusion equations have several applications in the feld of population dynamics and some o...
Reaction-diffusion equations have several applications in the feld of population dynamics and some o...
The scalar initial value problem ut = ρDu+ f(u), is a model for dispersal. Here u represents the den...
Reaction-diffusion equations have several applications in the field of population dynamics and some ...