%0 Journal Article %1 huillet2009duality %A Huillet, Thierry %A Möhle, Martin %D 2009 %J J. Appl. Probab. %K Moran_model duality coalescent_theory %N 3 %P 866--893 %R 10.1239/jap/1253279856 %T Duality and asymptotics for a class of nonneutral discrete Moran models %U http://hal.archives-ouvertes.fr/docs/00/35/60/83/PDF/art07.pdf %V 46 %X A Markov chain X with finite state space 0,...,N and tridiagonal transition matrix is considered, where transitions from i to i-1 occur with probability (i/N)(1-p(i/N)) and transitions from i to i+1 occur with probability (1-i/N)p(i/N). Here p:0,1→0,1 is a given function. It is shown that if p is continuous with p(x)≤p(1) for all x∈0,1 then, for each N, a dual process Y to X (with respect to a specific duality function) exists if and only if 1-p is completely monotone with p(0)=0. A probabilistic interpretation of Y in terms of an ancestral process of a mixed multitype Moran model with a random number of types is presented. It is shown that, under weak conditions on p, the process Y, properly time and space scaled, converges to an Ornstein--Uhlenbeck process as N tends to ∞. The asymptotics of the stationary distribution of Y is studied as N tends to ∞. Examples are presented involving selection mechanisms. results.

@article{huillet2009duality, abstract = { A Markov chain X with finite state space {0,...,N} and tridiagonal transition matrix is considered, where transitions from i to i-1 occur with probability (i/N)(1-p(i/N)) and transitions from i to i+1 occur with probability (1-i/N)p(i/N). Here p:[0,1]→[0,1] is a given function. It is shown that if p is continuous with p(x)≤p(1) for all x∈[0,1] then, for each N, a dual process Y to X (with respect to a specific duality function) exists if and only if 1-p is completely monotone with p(0)=0. A probabilistic interpretation of Y in terms of an ancestral process of a mixed multitype Moran model with a random number of types is presented. It is shown that, under weak conditions on p, the process Y, properly time and space scaled, converges to an Ornstein--Uhlenbeck process as N tends to ∞. The asymptotics of the stationary distribution of Y is studied as N tends to ∞. Examples are presented involving selection mechanisms. results. }, added-at = {2010-07-30T22:55:54.000+0200}, author = {Huillet, Thierry and M{\"o}hle, Martin}, biburl = {https://www.bibsonomy.org/bibtex/247b748a0353ee3acfb53b8450e7ca081/peter.ralph}, coden = {JPRBAM}, description = {MR: Publications results for "MR Number=(2562326)"}, doi = {10.1239/jap/1253279856}, fjournal = {Journal of Applied Probability}, interhash = {b781c3ab835035ff9ce1f9d307a26839}, intrahash = {47b748a0353ee3acfb53b8450e7ca081}, issn = {0021-9002}, journal = {J. Appl. Probab.}, keywords = {Moran_model duality coalescent_theory}, mrclass = {60K35}, mrnumber = {MR2562326}, number = 3, pages = {866--893}, timestamp = {2014-05-19T20:40:08.000+0200}, title = {Duality and asymptotics for a class of nonneutral discrete {M}oran models}, url = {http://hal.archives-ouvertes.fr/docs/00/35/60/83/PDF/art07.pdf}, volume = 46, year = 2009 }