Stability in a class of discrete time models of interacting populations
- 1 January 1977
- journal article
- Published by Springer Nature in Journal of Mathematical Biology
- Vol. 4 (3) , 265-274
- https://doi.org/10.1007/bf00280976
Abstract
Effective Lyapunov and Lyapunov-like functions for a class of discrete time models of interacting populations are presented. These functions are constructed on the biologically meaningful principle that a viable population must absorb energy from external sources when its density is low and it must dissipate energy to the environment when its density is high. These functions can be used to establish that a discrete time model is globally stable or that its solutions are ultimately confined to an acceptable region of the state space. The latter is especially interesting when the model has chaotic solutions. These methods are applied to a single species model and a model of competition between two species.Keywords
This publication has 12 references indexed in Scilit:
- Biological populations obeying difference equations: Stable points, stable cycles, and chaosPublished by Elsevier ,2004
- Optimum size limit for a fishery with a limited fishing seasonEcological Modelling, 1977
- Global Stability in Many-Species SystemsThe American Naturalist, 1977
- Stability in a stock-recruitment model of an exploited fisheryMathematical Biosciences, 1977
- Discrete time models for two-species competitionTheoretical Population Biology, 1976
- An Ideal Penalty Function for Constrained OptimizationIMA Journal of Applied Mathematics, 1975
- Dynamic complexity in predator-prey models framed in difference equationsNature, 1975
- Biological Populations with Nonoverlapping Generations: Stable Points, Stable Cycles, and ChaosScience, 1974
- Dynamic Analysis in “Soft Science” Studies: In Defense of Difference EquationsPublished by Springer Nature ,1974
- Control System Analysis and Design Via the “Second Method” of Lyapunov: II—Discrete-Time SystemsJournal of Basic Engineering, 1960