We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Dirichlet boundary conditions. For a class of nonconvex domains composed by balls connected with thin corridors, we show the occurrence of pattern formation (coexistence and spatial segregation of all the species), as the competition grows indefinitely. As a result we prove the existence and uniqueness of solutions for a remarkable system of differential inequalities involved in segregation phenomena and optimal partition problems
The purpose of this thesis is the mathematical and numerical study of a system of several species co...
summary:Two species of animals are competing in the same environment. Under what conditions do they ...
Existence, uniqueness, and stability of coexistence states in the diffusive Lotka-Volterra model for...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Diri...
Spatial segregation occurs in population dynamics when k species interact in a highly competitive wa...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Neuman...
AbstractThis paper is concerned with the spatial behavior of the non-autonomous competition–diffusio...
In this paper we study positive steady-state solutions of a reaction-diffusion model, the Lotka-Volt...
AbstractFor a class of population models of competitive type, we study the asymptotic behavior of th...
AbstractIn this paper we study positive steady-state solutions of a reaction-diffusion model, the Lo...
We investigate the long term behavior for a class of competition\u2013diffusion systems of Lotka\u20...
AbstractThe coexistence and stability of the population densities of two competing species in a boun...
For a class of population models ofcompetitive type, we study the asymptotic behavior of the positiv...
International audienceIt is known that the competitive exclusion principle holds for a large kind of...
We provide a set of numerical simulations for the spatial segregation limit of two diffusive Lotka-...
The purpose of this thesis is the mathematical and numerical study of a system of several species co...
summary:Two species of animals are competing in the same environment. Under what conditions do they ...
Existence, uniqueness, and stability of coexistence states in the diffusive Lotka-Volterra model for...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Diri...
Spatial segregation occurs in population dynamics when k species interact in a highly competitive wa...
We deal with strongly competing multispecies systems of Lotka-Volterra type with homogeneous Neuman...
AbstractThis paper is concerned with the spatial behavior of the non-autonomous competition–diffusio...
In this paper we study positive steady-state solutions of a reaction-diffusion model, the Lotka-Volt...
AbstractFor a class of population models of competitive type, we study the asymptotic behavior of th...
AbstractIn this paper we study positive steady-state solutions of a reaction-diffusion model, the Lo...
We investigate the long term behavior for a class of competition\u2013diffusion systems of Lotka\u20...
AbstractThe coexistence and stability of the population densities of two competing species in a boun...
For a class of population models ofcompetitive type, we study the asymptotic behavior of the positiv...
International audienceIt is known that the competitive exclusion principle holds for a large kind of...
We provide a set of numerical simulations for the spatial segregation limit of two diffusive Lotka-...
The purpose of this thesis is the mathematical and numerical study of a system of several species co...
summary:Two species of animals are competing in the same environment. Under what conditions do they ...
Existence, uniqueness, and stability of coexistence states in the diffusive Lotka-Volterra model for...