Uniform Decay Estimates for Solutions of a Class of Retarded Integral Inequalities

Abstract

Some uniform decay estimates are established for solutions of the following type of retarded integral inequalities: y(t)≤ E(t,τ)||yτ||+∫τt K1(t,s)||ys||ds+∫t∞ K2(t,s)||ys||ds+, 0.5cm t≥τ≥ 0. As a simple example of application, the retarded scalar functional differential equation x=-a(t)x+B(t,xt) is considered, and the global asymptotic stability of the equation is proved under weaker conditions. Another example is the ODE system x=F0(t,x)+Σi=1m Fi(t,x(t-ri(t))) on Rn with superlinear nonlinearities Fi (0≤ i≤ m). The existence of a global pullback attractor of the system is established under appropriate dissipation conditions. The third example for application concerns the study of the dynamics of the functional cocycle system dudt+Au=F(θtp,ut) in a Banach space X with sublinear nonlinearity. In particular, the existence and uniqueness of a nonautonomous stationary solution is obtained under the hyperbolicity assumption on operator A and some additional hypotheses, and the global asymptotic stability of is also addressed.