AbstractWe consider a competition–diffusion system for two competing species; the density of the first species satisfies a parabolic equation together with an inhomogeneous Dirichlet boundary condition whereas the second one either satisfies a parabolic equation with a homogeneous Neumann boundary condition, or an ordinary differential equation. Under the situation where the two species spatially segregate as the interspecific competition rate becomes large, we show that the resulting limit problem turns out to be a free boundary problem. We focus on the singular limit of the interspecific reaction term, which involves a measure located on the free boundary
AbstractThe coexistence and stability of the population densities of two competing species in a boun...
We study the large-interaction limit of an elliptic system modelling the steady states of two speci...
AbstractWe show that under certain additional hypothesis, two population competing species models in...
AbstractWe consider a competition–diffusion system for two competing species; the density of the fir...
Abstract: In this paper we consider the spatial segregation limit for a reaction-diffusion $(\mathrm...
AbstractFor a class of population models of competitive type, we study the asymptotic behavior of th...
We report on known results on the geometry of the limiting solutions of a reaction-diffusion system ...
AbstractWe consider a three-component reaction–diffusion system with a reaction rate parameter, and ...
[[abstract]]We study a Lotka–Volterra type weak competition model with a free boundary in a one-dime...
AbstractThis paper is concerned with the spatial behavior of the non-autonomous competition–diffusio...
summary:Two species of animals are competing in the same environment. Under what conditions do they ...
We study a competition-diffusion model while performing simultaneous homogenization and strong compe...
We consider a mathematical model for the spatio-temporal evolution of two biological species in a co...
AbstractA two-species Lotka–Volterra competition–diffusion model with spatially inhomogeneous reacti...
[[abstract]]To understand the spreading and interaction of two-competing species, we study the dynam...
AbstractThe coexistence and stability of the population densities of two competing species in a boun...
We study the large-interaction limit of an elliptic system modelling the steady states of two speci...
AbstractWe show that under certain additional hypothesis, two population competing species models in...
AbstractWe consider a competition–diffusion system for two competing species; the density of the fir...
Abstract: In this paper we consider the spatial segregation limit for a reaction-diffusion $(\mathrm...
AbstractFor a class of population models of competitive type, we study the asymptotic behavior of th...
We report on known results on the geometry of the limiting solutions of a reaction-diffusion system ...
AbstractWe consider a three-component reaction–diffusion system with a reaction rate parameter, and ...
[[abstract]]We study a Lotka–Volterra type weak competition model with a free boundary in a one-dime...
AbstractThis paper is concerned with the spatial behavior of the non-autonomous competition–diffusio...
summary:Two species of animals are competing in the same environment. Under what conditions do they ...
We study a competition-diffusion model while performing simultaneous homogenization and strong compe...
We consider a mathematical model for the spatio-temporal evolution of two biological species in a co...
AbstractA two-species Lotka–Volterra competition–diffusion model with spatially inhomogeneous reacti...
[[abstract]]To understand the spreading and interaction of two-competing species, we study the dynam...
AbstractThe coexistence and stability of the population densities of two competing species in a boun...
We study the large-interaction limit of an elliptic system modelling the steady states of two speci...
AbstractWe show that under certain additional hypothesis, two population competing species models in...