Demographic and Environmental Stochasticity Concepts and Definitions

SUMMARY General definitions of demographic and environmental variances as well as demographic covariance are given from first principles. The sum of the environmental variance and the demographic covariance is the covariance betweeen two individuals' contributions to the population growth within a year and corresponds to the coefficient of x2 in the expression for the variance of the change in population size. Hence, this coefficient may actually be negative. The demographic variance is the variance among individuals. It is shown that the definitions are consistent with use of these terms in models with additive effects and in diffusion approximations to population processes. The connection to classical birth and death processes, in which the environmental variance and demographic covariance is always zero, is discussed. The concepts are illustrated by some stochastic simulations.

[1]  Brian Dennis,et al.  Estimation of Growth and Extinction Parameters for Endangered Species , 1991 .

[2]  R M May,et al.  Harvesting Natural Populations in a Randomly Fluctuating Environment , 1977, Science.

[3]  E. Leigh,et al.  The average lifetime of a population in a varying environment. , 1981, Journal of theoretical biology.

[4]  Samuel Karlin,et al.  On Branching Processes with Random Environments: I: Extinction Probabilities , 1971 .

[5]  Robert M. May,et al.  Stability in Randomly Fluctuating Versus Deterministic Environments , 1973, The American Naturalist.

[6]  N Keiding,et al.  Extinction and exponential growth in random environments. , 1975, Theoretical population biology.

[7]  Steinar Engen,et al.  Optimal Harvesting of Fluctuating Populations with a Risk of Extinction , 1995, The American Naturalist.

[8]  Daniel Goodman,et al.  Viable Populations for Conservation: The demography of chance extinction , 1987 .

[9]  Samuel Karlin,et al.  Branching processes with random environments , 1970 .

[10]  Jonathan Roughgarden,et al.  A Simple Model for Population Dynamics in Stochastic Environments , 1975, The American Naturalist.

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

[12]  S. Karlin,et al.  A second course in stochastic processes , 1981 .

[13]  R. May,et al.  Stability and Complexity in Model Ecosystems , 1976, IEEE Transactions on Systems, Man, and Cybernetics.

[14]  R. Lande,et al.  Population dynamic models generating the lognormal species abundance distribution. , 1996, Mathematical biosciences.

[15]  M. Turelli Random environments and stochastic calculus. , 1977, Theoretical population biology.

[16]  C. Heyde,et al.  Confidence intervals for demographic projections based on products of random matrices. , 1985, Theoretical population biology.