TY - JOUR
T1 - Discrete-time population dynamics of spatially distributed semelparous two-sex populations
AU - Thieme, Horst R.
N1 - Funding Information:
I thank Gaël Raoul and an anonymous referee for their many helpful and constructive comments which have improved the paper considerably.
Publisher Copyright:
© 2021, The Author(s), under exclusive licence to Springer-Verlag GmbH Germany, part of Springer Nature.
PY - 2021/8
Y1 - 2021/8
N2 - Spatially distributed populations with two sexes may face the problem that males and females concentrate in different parts of the habitat and mating and reproduction does not happen sufficiently often for the population to persist. For simplicity, to explore the impact of sex-dependent dispersal on population survival, we consider a discrete-time model for a semelparous population where individuals reproduce only once in their life-time, during a very short reproduction season. The dispersal of females and males is modeled by Feller kernels and the mating by a homogeneous pair formation function. The spectral radius of a homogeneous operator is established as basic reproduction number of the population, R. If R< 1 , the extinction state is locally stable, and if R> 1 the population shows various degrees of persistence that depend on the irreducibility properties of the dispersal kernels. Special cases exhibit how sex-biased dispersal affects the persistence of the population.
AB - Spatially distributed populations with two sexes may face the problem that males and females concentrate in different parts of the habitat and mating and reproduction does not happen sufficiently often for the population to persist. For simplicity, to explore the impact of sex-dependent dispersal on population survival, we consider a discrete-time model for a semelparous population where individuals reproduce only once in their life-time, during a very short reproduction season. The dispersal of females and males is modeled by Feller kernels and the mating by a homogeneous pair formation function. The spectral radius of a homogeneous operator is established as basic reproduction number of the population, R. If R< 1 , the extinction state is locally stable, and if R> 1 the population shows various degrees of persistence that depend on the irreducibility properties of the dispersal kernels. Special cases exhibit how sex-biased dispersal affects the persistence of the population.
KW - Basic turnover number
KW - Eigenfunctional
KW - Extinction
KW - Integral projection models
KW - Integro-difference equations
KW - Net reproductive value
KW - Ordered normed vector spaces
KW - Population growth factor
KW - Spectral radius of homogeneous operators
KW - Stability
KW - Uniform persistence
KW - compact attractor
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U2 - 10.1007/s00285-021-01649-4
DO - 10.1007/s00285-021-01649-4
M3 - Article
C2 - 34322725
AN - SCOPUS:85111538452
SN - 0303-6812
VL - 83
JO - Journal of Mathematical Biology
JF - Journal of Mathematical Biology
IS - 2
M1 - 18
ER -