International audienceWe consider a integro-differential nonlinear model that describes the evolution of a population structured by a quantitative trait. The interactions between traits occur from competition for resources whose concentrations depend on the current state of the population. Following the formalism of~\cite{DJMP}, we study a concentration phenomenon arising in the limit of strong selection and small mutations. We prove that the population density converges to a sum of Dirac masses characterized by the solution $\varphi$ of a Hamilton-Jacobi equation which depends on resource concentrations that we fully characterize in terms of the function $\varphi$
A Hamilton-Jacobi formulation has been established previously for phenotypically structured populati...
A proper understanding of the links between varying gene expression levels and complex trait adaptat...
The nonlocal Fisher equation has been proposed as a simple model exhibiting Turing instability and t...
AbstractWe consider an integro-differential nonlinear model that describes the evolution of a popula...
International audienceWe consider a integro-differential nonlinear model that describes the evolutio...
We study two equations of Lotka-Volterra type that describe the Darwinian evolution of a population ...
How to recast effects of habitat shrinking and global warming on evolutionary dynamics into continuo...
International audienceWe study a mathematical model describing the growth process of a population st...
International audienceWe study the dynamics of phenotypically structured populations in environments...
This thesis focuses on the dynamics of Dirac mass concentrations in non-local partial differential a...
We study a parabolic Lotka-Volterra type equation that describes the evolution of a population struc...
International audienceIn this work, we characterize the solution of a system of elliptic integro-dif...
We consider an integro-PDE model for a population structured by the spatial variables and a trait va...
A Hamilton-Jacobi formulation has been established previously for phenotypically structured populati...
A proper understanding of the links between varying gene expression levels and complex trait adaptat...
The nonlocal Fisher equation has been proposed as a simple model exhibiting Turing instability and t...
AbstractWe consider an integro-differential nonlinear model that describes the evolution of a popula...
International audienceWe consider a integro-differential nonlinear model that describes the evolutio...
We study two equations of Lotka-Volterra type that describe the Darwinian evolution of a population ...
How to recast effects of habitat shrinking and global warming on evolutionary dynamics into continuo...
International audienceWe study a mathematical model describing the growth process of a population st...
International audienceWe study the dynamics of phenotypically structured populations in environments...
This thesis focuses on the dynamics of Dirac mass concentrations in non-local partial differential a...
We study a parabolic Lotka-Volterra type equation that describes the evolution of a population struc...
International audienceIn this work, we characterize the solution of a system of elliptic integro-dif...
We consider an integro-PDE model for a population structured by the spatial variables and a trait va...
A Hamilton-Jacobi formulation has been established previously for phenotypically structured populati...
A proper understanding of the links between varying gene expression levels and complex trait adaptat...
The nonlocal Fisher equation has been proposed as a simple model exhibiting Turing instability and t...