A Global Attractivity in a Nonmonotone Age-Structured Model with Age Dependent Diffusion and Death Rates

Abstract

In this paper, we investigated the global attractivity of the positive constant steady state solution of the mature population w(t,x) governed by the age-structured model: equation* \arrayll ∂ u∂ t+∂ u∂ a=D(a)∂ 2 u∂ x2 - d(a)u, & t≥ t0≥ Al,\;a≥ 0,\; 0< x< π,\\ w(t,x)=∫rAlu(t,a,x)da,& t≥ t0≥ Al,\; 0<x<π,\\ u(t,0,x)=f(w(t,x)), & t≥ t0≥ Al,\; 0<x<π,\\ ux(t,a,0)=ux(t,a,π)=0,\;& t≥ t0≥ Al,\; a ≥ 0, array . equation* when the diffusion rate D(a) and the death rate d(a) are age dependent, and when the birth function f(w) is nonmonotone. We also presented some illustrative examples.