Periodic Solutions of First-Order Functional Differential Equations in Population Dynamics
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Book Overview
This book provides cutting-edge results on the existence of multiple positive periodic solutions of first-order functional differential equations. It demonstrates how the Leggett-Williams fixed-point theorem can be applied to study the existence of two or three positive periodic solutions of functional differential equations with real-world applications, particularly with regard to the Lasota-Wazewska model, the Hematopoiesis model, the Nicholsons Blowflies model, and some models with Allee effects. Many interesting sufficient conditions are given for the dynamics that include nonlinear characteristics exhibited by population models. The last chapter provides results related to the global appeal of solutions to the models considered in the earlier chapters. The techniques used in this book can be easily understood by anyone with a basic knowledge of analysis. This book offers a valuable reference guide for students and researchers in the field of differential equations with applications to biology, ecology, and the environment.
Format:Paperback
Language:English
ISBN:8132235428
ISBN13:9788132235422
Release Date:September 2016
Publisher:Springer
Length:144 Pages
Weight:0.51 lbs.
Dimensions:0.3" x 6.1" x 9.2"
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