CONNECTING THE PARAMETERS OF LOCAL EXTINCTION AND METAPOPULATION DYNAMICS

This paper explores the correspondence between the parameters of an extinction model analysed by Lande, Foley and Middleton et al. and the parameters of the incidence function model of metapopulation dynamics. The parameters of the extinction model, the intrinsic rate of population increase (r), its variance (v) and the population ceiling (K), can be mapped to the parameters of the incidence function model describing the scaling of the probability of local extinction (E) with patch area (A), E = eA X, via the equations s = x and r = eDs/s, where s = 2r/v, D is population density and K= DA. I explore this correspondence with two empirical examples, a mainlandisland metapopulation of the European common shrew (Sorex araneus) on islands in lakes and a classical metapopulation of the American pika (Ochotona princess. The most robust result is the correspondence x = 2r/v, which value decreases with increasing strength of environmental stochasticity. Thus the impact of environmental stochasticity on population dynamics can, in principle, be inferred from the pattern of habitat patch occupancy in a metapopulation.

[1]  P. Foley,et al.  Predicting Extinction Times from Environmental Stochasticity and Carrying Capacity , 1994 .

[2]  James H. Brown,et al.  Turnover Rates in Insular Biogeography: Effect of Immigration on Extinction , 1977 .

[3]  Andrew T. Smith Temporal Changes in Insular Populations of the Pika (Ochotona Princeps) , 1980 .

[4]  Knut Schmidt-Nielsen,et al.  Animal Physiology: Adaptation and Environment , 1985 .

[5]  Atte Moilanen,et al.  Predicting the Occurrence of Endangered Species in Fragmented Landscapes , 1996, Science.

[6]  I. Hanski Dynamics of small mammals on islands , 1993 .

[7]  R. Lande,et al.  EXTINCTION TIMES IN FINITE METAPOPULATION MODELS WITH STOCHASTIC LOCAL DYNAMICS , 1998 .

[8]  Ilkka Hanski,et al.  Inferences from Ecological Incidence Functions , 1992, The American Naturalist.

[9]  H. Remmert Minimum Animal Populations , 1994, Ecological Studies.

[10]  B. Sheftel Long-term and seasonal dynamics of shrews in Central Siberia , 1989 .

[11]  M. Gilpin,et al.  Metapopulation Biology: Ecology, Genetics, and Evolution , 1997 .

[12]  Ilkka Hanski,et al.  On Expected Lifetimes of Small-Bodied and Large-Bodied Species of Birds on Islands , 1995, The American Naturalist.

[13]  I. Hanski A Practical Model of Metapopulation Dynamics , 1994 .

[14]  Andrew T. Smith THE DISTRIBUTION AND DISPERSAL OF PIKAS: CONSEQUENCES OF INSULAR POPULATION STRUCTURE' , 1974 .

[15]  M. Hassell,et al.  Random walks in a metapopulation : how much density dependence is necessary for long-term persistence ? , 1996 .

[16]  I. Hanski,et al.  Patch-occupancy dynamics in fragmented landscapes. , 1994, Trends in ecology & evolution.

[17]  Terry L. Root,et al.  ENERGY CONSTRAINTS ON AVIAN DISTRIBUTIONS AND ABUNDANCES , 1988 .

[18]  A. Milne On a theory of natural control of insect population , 1962 .

[19]  P. Foley,et al.  Extinction Models for Local Populations , 1997 .

[20]  R. Peters The Ecological Implications of Body Size , 1983 .

[21]  A. Veitch,et al.  The Effect of an Upper Limit to Population Size on Persistence Time , 1995 .

[22]  I. Hanski Population biology of Eurasian shrews : towards a synthetis , 1989 .

[23]  G. Bartholomew Body temperature and energy metabolism , 1982 .

[24]  Malcolm S. Gordon,et al.  Animal Physiology: Principles and Adaptations , 1972 .

[25]  Ilkka Hanski,et al.  Patterns of Island Occupancy Explained by Colonization and Extinction Rates in Shrews , 1991 .

[26]  J. Diamond,et al.  Immigration and extinction probabilities for individual species: relation to incidence functions and species colonization curves. , 1981, Proceedings of the National Academy of Sciences of the United States of America.

[27]  Ilkka Hanski,et al.  Metapopulation Dynamics: From Concepts and Observations to Predictive Models , 1997 .

[28]  R. Levins Some Demographic and Genetic Consequences of Environmental Heterogeneity for Biological Control , 1969 .

[29]  R. Lande Risks of Population Extinction from Demographic and Environmental Stochasticity and Random Catastrophes , 1993, The American Naturalist.

[30]  M E Gilpin,et al.  Calculation of immigration and extinction curves from the species-area-distance relation. , 1976, Proceedings of the National Academy of Sciences of the United States of America.

[31]  Ilkka Hanski,et al.  Long‐Term Dynamics in a Metapopulation of the American Pika , 1998, The American Naturalist.

[32]  A. Milne The Natural Control of Insect Populations , 1957, The Canadian Entomologist.

[33]  Ilkka Hanski,et al.  2. Predictive and Practical Metapopulation Models: The Incidence Function Approach , 1998 .