On the number of segregating sites for populations with large family sizes
DOI10.1239/aap/1158685000zbMath1112.92046OpenAlexW2130550925MaRDI QIDQ5395358
Publication date: 2 November 2006
Published in: Advances in Applied Probability (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1239/aap/1158685000
infinitely-many-sites modelstochastic difference equationmultiple collisionstotal number of mutations
Central limit and other weak theorems (60F05) Problems related to evolution (92D15) Applications of Markov chains and discrete-time Markov processes on general state spaces (social mobility, learning theory, industrial processes, etc.) (60J20) Applications of stochastic analysis (to PDEs, etc.) (60H30) Genetics and epigenetics (92D10) Continuous-time Markov processes on discrete state spaces (60J27)
Related Items
Cites Work
- Unnamed Item
- Small-time behavior of beta coalescents
- Random recursive trees and the Bolthausen-Sznitman coalescent
- The coalescent
- A fixed point theorem for distributions
- On Ruelle's probability cascades and an abstract cavity method
- Stochastic flows associated to coalescent processes
- Coalescents with multiple collisions
- Coalescents with simultaneous multiple collisions
- The contraction method for recursive algorithms
- On subordinators, self-similar Markov processes and some factorizations of the exponential variable
- A classification of coalescent processes for haploid exchangeable population models
- On the contraction method with degenerate limit equation.
- Beta-coalescents and continuous stable random trees
- A coalescent model for the effect of advantageous mutations on the genealogy of a population
- On a stochastic difference equation and a representation of non–negative infinitely divisible random variables
- The stochastic equation Yn+1=AnYn + Bn with stationary coefficients
- The general coalescent with asynchronous mergers of ancestral lines
- A limit theorem for “quicksort”
