AbstractIn the classical model of population genetics for continuous time (Fisher's equation) for n alleles a stationary point is called regular if the viability of each of the absent alleles is distinct from the average viability of the population. It is shown that if the ω-limit set of a trajectory contains a regular point, then it contains only one point
ADInternational audienceGeneralized Polya urn models have been used to model the establishment dynam...
We consider a continuous time stochastic individual based model for a population structured only by ...
In this paper we shortly discuss the problem of the equilibrium in the well-known Fisher type select...
AbstractIn the classical model of population genetics for continuous time (Fisher's equation) for n ...
Near the beginning of the last century, R. A. Fisher and Sewall Wright devised an elegant, mathemati...
We study a parabolic Lotka-Volterra type equation that describes the evolution of a population struc...
44 pages, 9 figuresWe study the convergence towards a unique equilibrium distribution of the solutio...
This article is concerned with the long time behavior of neutral genetic population models, with fix...
International audienceThis article is concerned with the long-time behavior of neutral genetic popul...
29 pages, 4 imagesWe are interested in the dynamics of a population structured by a phenotypic trait...
AbstractFor a population genetic model with differential fertility it is shown that every solution t...
International audienceContinuum limits in the form of stochastic differential equations are typicall...
We construct a new continuous time select ion-mutation-recombination model for population dynamics, ...
ADInternational audienceGeneralized Polya urn models have been used to model the establishment dynam...
We consider a continuous time stochastic individual based model for a population structured only by ...
In this paper we shortly discuss the problem of the equilibrium in the well-known Fisher type select...
AbstractIn the classical model of population genetics for continuous time (Fisher's equation) for n ...
Near the beginning of the last century, R. A. Fisher and Sewall Wright devised an elegant, mathemati...
We study a parabolic Lotka-Volterra type equation that describes the evolution of a population struc...
44 pages, 9 figuresWe study the convergence towards a unique equilibrium distribution of the solutio...
This article is concerned with the long time behavior of neutral genetic population models, with fix...
International audienceThis article is concerned with the long-time behavior of neutral genetic popul...
29 pages, 4 imagesWe are interested in the dynamics of a population structured by a phenotypic trait...
AbstractFor a population genetic model with differential fertility it is shown that every solution t...
International audienceContinuum limits in the form of stochastic differential equations are typicall...
We construct a new continuous time select ion-mutation-recombination model for population dynamics, ...
ADInternational audienceGeneralized Polya urn models have been used to model the establishment dynam...
We consider a continuous time stochastic individual based model for a population structured only by ...
In this paper we shortly discuss the problem of the equilibrium in the well-known Fisher type select...
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