Dynamic properties of a class of forced positive higher-order scalar difference equations: persistency, stability and convergence

Franco, Daniel; Guiver, Chris; Logemann, Hartmut; Perán, Juan

Dynamic properties of a class of forced positive higher-order scalar difference equations: persistency, stability and convergence

Franco, Daniel; Guiver, Chris; Logemann, Hartmut; Perán, Juan

Authors

Daniel Franco

Dr Chris Guiver C.Guiver@napier.ac.uk
Lecturer

Hartmut Logemann

Juan Perán

Abstract

Persistency, stability and convergence properties are considered for a class of nonlinear, forced, positive, scalar higher-order difference equations. Sufficient conditions for these properties to hold are derived, broadly in terms of the interplay of the linear and nonlinear components of the difference equations. The convergence results presented include asymptotic response properties when the system is subject to (asymptotically) almost periodic forcing. The equations under consideration arise in a number of ecological and biological contexts, with the Allen-Clark population model appearing as a special case. We illustrate our results by several examples from population dynamics.

Citation

Franco, D., Guiver, C., Logemann, H., & Perán, J. (in press). Dynamic properties of a class of forced positive higher-order scalar difference equations: persistency, stability and convergence. Journal of Difference Equations and Applications,

Journal Article Type	Article
Acceptance Date	Jan 23, 2025
Deposit Date	Jan 24, 2025
Journal	Journal of Difference Equations and Applications
Print ISSN	1023-6198
Electronic ISSN	1563-5120
Publisher	Taylor and Francis
Peer Reviewed	Peer Reviewed
Keywords	Allen-Clark model, Almost periodic forcing, Difference equation, Persistence, Positive Lur'e system, Stability
Publisher URL	https://www.tandfonline.com/journals/gdea20