DISPERSAL AND PATTERN-FORMATION IN A DISCRETE-TIME PREDATOR-PREY MODEL

被引:242
作者
NEUBERT, MG
KOT, M
LEWIS, MA
机构
[1] UNIV WASHINGTON,DEPT APPL MATH,SEATTLE,WA 98195
[2] UNIV UTAH,DEPT MATH,SALT LAKE CITY,UT 84112
来源
THEORETICAL POPULATION BIOLOGY | 1995年 / 48卷 / 01期
关键词
D O I
10.1006/tpbi.1995.1020
中图分类号
Q14 [生态学(生物生态学)];
学科分类号
071012 ; 0713 ;
摘要
We investigate the dispersal-driven instabilities that arise in a discrete-time predator-prey model formulated as a system of integrodifference equations. Integrodifference equations contain two components: (1) difference equations, which model growth and interactions during a sedentary stage, and (2) redistribution kernels, which characterize the distribution of dispersal distances that arise during a vagile stage. Redistribution kernels have been measured for a tremendous number of organisms. We derive a number of redistribution kernels from first principles. Integrodifference equations generate pattern under a far broader set of ecological conditions than do reaction-diffusion models. We delineate the necessary conditions for dispersal-driven instability for two-species systems and follow this with a detailed analysis of a particular predator-prey model. (C) 1995 Academic Press, Inc.
引用
收藏
页码:7 / 43
页数:37
相关论文
共 105 条
[51]  
LAUWERIER H A, 1986, IMA Journal of Mathematics Applied in Medicine and Biology, V3, P191
[52]   THE PROBLEM OF PATTERN AND SCALE IN ECOLOGY [J].
LEVIN, SA .
ECOLOGY, 1992, 73 (06) :1943-1967
[53]   HYPOTHESIS FOR ORIGIN OF PLANKTONIC PATCHINESS [J].
LEVIN, SA ;
SEGEL, LA .
NATURE, 1976, 259 (5545) :659-659
[54]   SPATIAL PATTERNING OF THE SPRUCE BUDWORM [J].
LUDWIG, D ;
ARONSON, DG ;
WEINBERGER, HF .
JOURNAL OF MATHEMATICAL BIOLOGY, 1979, 8 (03) :217-258
[55]   A NON-LINEAR INTEGRAL OPERATOR ARISING FROM A MODEL IN POPULATION-GENETICS .2. INITIAL DATA WITH COMPACT SUPPORT [J].
LUI, R .
SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 1982, 13 (06) :938-953
[56]  
LUI R, 1983, J MATH BIOL, V16, P199
[57]   A NON-LINEAR INTEGRAL OPERATOR ARISING FROM A MODEL IN POPULATION-GENETICS .1. MONOTONE INITIAL DATA [J].
LUI, R .
SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 1982, 13 (06) :913-937
[58]   BIOLOGICAL GROWTH AND SPREAD MODELED BY SYSTEMS OF RECURSIONS .2. BIOLOGICAL THEORY [J].
LUI, R .
MATHEMATICAL BIOSCIENCES, 1989, 93 (02) :297-312
[59]   A NONLINEAR INTEGRAL OPERATOR ARISING FROM A MODEL IN POPULATION-GENETICS .4. CLINES [J].
LUI, R .
SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 1986, 17 (01) :152-168
[60]   BIOLOGICAL GROWTH AND SPREAD MODELED BY SYSTEMS OF RECURSIONS .1. MATHEMATICAL-THEORY [J].
LUI, R .
MATHEMATICAL BIOSCIENCES, 1989, 93 (02) :269-295
12345678910