A large deviation principle is established for the Poisson-Dirichlet distribution when the mutation rate [theta] converges to zero. The rate function is identified explicitly, and takes on finite values only on states that have finite number of alleles. This result is then applied to the study of the asymptotic behavior of the homozygosity, and the Poisson-Dirichlet distribution with selection. The latter shows that several alleles can coexist when selection intensity goes to infinity in a particular way as [theta] approaches zero.Poisson-Dirichlet distribution Dirichlet process Homozygosity Large deviations Selection
Abstract. Hitting times of the global optimum for evolutionary algo-rithms are usually available for...
We present an approach for identifying genes under natural selection using polymorphism and divergen...
International audienceThe Luria-Delbrück distribution is a classical model of mutations in cell kine...
Large deviation principles are established for the Fleming-Viot processes with neutral mutation and ...
AbstractLarge deviation principles are established for the Fleming–Viot processes with neutral mutat...
The Dirichlet process has been extensively studied over the last thirty years, along with various ge...
To explain the nature of genetic variability for quantitative traits in infinitely large natural pop...
We consider a Markov chain on the space of (countable) partitions of the interval [0; 1], obtained f...
this paper is to show that the infinite-alleles model with overdominant selection "looks like&q...
We investigate a continuous time, probability measure-valued dynamical system that describes the pro...
This paper discusses a symptotic behavior of one-and two-parameter Poisson-Dirichlet models, that is...
We consider the accumulation of beneficial and deleterious mutations in asexual populations. The rat...
For any m ≥ 2, the homozygosity of order m of a population is the probability that a sample of size ...
Using a new and more general genetic model called the discrete-allelic state model and assuming disc...
Dirichlet distribution, gamma process We study partition distributions in a population genetics mode...
Abstract. Hitting times of the global optimum for evolutionary algo-rithms are usually available for...
We present an approach for identifying genes under natural selection using polymorphism and divergen...
International audienceThe Luria-Delbrück distribution is a classical model of mutations in cell kine...
Large deviation principles are established for the Fleming-Viot processes with neutral mutation and ...
AbstractLarge deviation principles are established for the Fleming–Viot processes with neutral mutat...
The Dirichlet process has been extensively studied over the last thirty years, along with various ge...
To explain the nature of genetic variability for quantitative traits in infinitely large natural pop...
We consider a Markov chain on the space of (countable) partitions of the interval [0; 1], obtained f...
this paper is to show that the infinite-alleles model with overdominant selection "looks like&q...
We investigate a continuous time, probability measure-valued dynamical system that describes the pro...
This paper discusses a symptotic behavior of one-and two-parameter Poisson-Dirichlet models, that is...
We consider the accumulation of beneficial and deleterious mutations in asexual populations. The rat...
For any m ≥ 2, the homozygosity of order m of a population is the probability that a sample of size ...
Using a new and more general genetic model called the discrete-allelic state model and assuming disc...
Dirichlet distribution, gamma process We study partition distributions in a population genetics mode...
Abstract. Hitting times of the global optimum for evolutionary algo-rithms are usually available for...
We present an approach for identifying genes under natural selection using polymorphism and divergen...
International audienceThe Luria-Delbrück distribution is a classical model of mutations in cell kine...