On Impulsive Beverton-Holt Difference Equations and their Applications
- 1 August 2004
- journal article
- research article
- Published by Informa UK Limited in Journal of Difference Equations and Applications
- Vol. 10 (9), 851-868
- https://doi.org/10.1080/10236190410001726421
Abstract
The asymptotic properties of the impulsive Beverton-Holt difference equation where p is a fixed positive integer, are considered. The results are applied to an impulsive logistic equation with non-constant coefficients In particular, sufficient extinction and non-extinction conditions are obtained for both equations.Keywords
This publication has 9 references indexed in Scilit:
- Linearized oscillation theory for a nonlinear delay impulsive equationJournal of Computational and Applied Mathematics, 2003
- Optimal impulsive harvesting policy for single populationNonlinear Analysis: Real World Applications, 2003
- Linearized oscillation of nonlinear impulsive delay differential equationsComputers & Mathematics with Applications, 2002
- Dynamics of Second Order Rational Difference EquationsPublished by Informa UK Limited ,2001
- Elements of Mathematical EcologyPublished by Cambridge University Press (CUP) ,2001
- Mathematical Models in Population Biology and EpidemiologyTexts in Applied Mathematics, 2001
- Generalisation of the Mandelbrot set to integral functions of quaternionsDiscrete & Continuous Dynamical Systems, 1999
- Population BiologyPublished by Springer Science and Business Media LLC ,1997
- Oscillation Theory of Delay Differential EquationsPublished by Oxford University Press (OUP) ,1991