Bisexual Galton–Watson branching processes with superadditive mating functions

Daley, D. J.; Hull, David M.; Taylor, James M.

doi:10.2307/3213999

Cited by 61 publications

(22 citation statements)

References 12 publications

(9 reference statements)

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“…One may cite as examples work on the extinction probability (e.g., Daley (1968), Hull (1982Hull ( , 1984, Bruss (1984), Daley et al (1986), or Alsmeyer and Rösler (2002)), the long term behaviour (e.g., Bagley (1986) or González andMolina (1996, 1997)), and inference problems (e.g., González-Fragoso (1995), Molina et al (1998), Alsmeyer and Rösler (1996), or González et al (2001)). Two interesting recent reviews are Hull (2003) and Haccou et al (2005).…”

Section: Pmentioning

confidence: 99%

Bisexual branching processes to model extinction conditions for Y-linked genes

González

Martínez

Mota

2009

Journal of Theoretical Biology

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In a two-sex monogamic population, the evolution of the number of carriers of the two alleles of a Y-linked gene is considered. To this end, a multitype bisexual branching model is presented in which it is assumed that the gene has no influence on the mating process. It is deduced from this model that the average numbers of female and male descendants per mating unit constitute the key to determining the extinction or survival of each allele. Moreover, the destiny of each allele in the population is found not to depend on the behaviour of the other.

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Section: Pmentioning

confidence: 99%

Bisexual branching processes to model extinction conditions for Y-linked genes

González

Martínez

Mota

2009

Journal of Theoretical Biology

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“…Hence (F n ) n≥0 is also supercritical and its extinction probability q less than 1. A numerical study in [7] showed for the case where p F and p M are Poisson with mean 1.2 that the extinction probability ratio…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

“…The bisexual Galton-Watson process with promiscuous mating (Z n ) n≥0 , shortly called promiscuous BGWP, is defined as follows: Consider a two sex population process (Z The formal definition of (Z Bisexual GWPs with various mating functions were introduced by Daley [6] and further investigated in a series of papers [5], [7], [8], [9]. The present article is a continuation of [1] where we compared in some detail the extinctive behavior of a promiscuous BGWP (Z n ) n≥0…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

Asexual Versus Promiscuous Bisexual Galton-Watson Processes: The Extinction Probability Ratio

Alsmeyer¹,

Rösler²

2002

Ann. Appl. Probab.

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We consider the supercritical bisexual Galton-Watson process (BGWP) with promiscuous mating, that is a branching process which behaves like an ordinary supercritical Galton-Watson process (GWP) as long as at least one male is born in each generation. For a certain example, it was pointed out by Daley et al. [7] that the extinction probability of such a BGWP apparently behaves like a constant times the respective probability of its asexual counterpart (where males do not matter) if the number of ancestors grows to infinity. In an earlier paper [1] we provided general upper and lower bounds for the ratio between both extinction probabilities and also numerical results that seemed to confirm the convergence of that ratio. However, theoretical considerations rather led us to the conjecture that this does not generally hold. The present article turns this conjecture into a rigorous result. The key step in our analysis is to identify the extinction probability ratio as a certain functional of a subcritical ordinary GWP and to prove its continuity as a function of the number of ancestors in a suitable topology associated with the Martin entrance boundary of that GWP.

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“…This is not a severe constraint, since most mating functions considered in two-sex branching process theory are superadditive (see, e.g. Hull (1982) or Daley et al (1986)). …”

Section: Probability Generating Functionsmentioning

confidence: 99%

“…Several classes of discrete-time two-sex (bisexual) branching processes have been studied, including the bisexual GaltonWatson process (see Alsmeyer and Rösler (1996), (2002), Bagley (1986), Bruss (1984), Daley (1968), and Daley et al (1986)); processes with immigration (see González et al (2000), (2001), and Ma and Xing (2006)); in varying environments (see , (2004a)); and processes depending on the number of couples in the population (see Molina et al (2002Molina et al ( ), (2004bMolina et al ( ), (2006, and Xing and Wang (2005)). We refer the reader to Hull (2003) or Haccou et al (2005, pp.…”

Section: Introductionmentioning

confidence: 99%

Two-Sex Branching Processes with Offspring and Mating in a Random Environment

Molina

2009

Journal of Applied Probability

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We introduce a class of discrete-time two-sex branching processes where the offspring probability distribution and the mating function are governed by an environmental process. It is assumed that the environmental process is formed by independent but not necessarily identically distributed random vectors. For such a class, we determine some relationships among the probability generating functions involved in the mathematical model and derive expressions for the main moments. Also, by considering different probabilistic approaches we establish several results concerning the extinction probability. A simulated example is presented as an illustration.

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Bisexual Galton–Watson branching processes with superadditive mating functions

Cited by 61 publications

References 12 publications

Bisexual branching processes to model extinction conditions for Y-linked genes

Bisexual branching processes to model extinction conditions for Y-linked genes

Asexual Versus Promiscuous Bisexual Galton-Watson Processes: The Extinction Probability Ratio

Two-Sex Branching Processes with Offspring and Mating in a Random Environment

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