Stability of solutions to some evolution problem

Abstract

Large time behavior of solutions to abstract differential equations is studied. The corresponding evolution problem is: u=A(t)u+F(t,u)+b(t), t 0; u(0)=u0. (*) Here u:= dudt, u=u(t)∈ H, t∈ +:=[0,∞), A(t) is a linear dissipative operator: Re(A(t)u,u) -γ(t)(u,u), γ(t) 0, F(t,u) is a nonlinear operator, \|F(t,u)\| c0\|u\|p, p>1, c0,p are constants, \|b(t)\| β(t), β(t) 0 is a continuous function. Sufficient conditions are given for the solution u(t) to problem (*) to exist for all t0, to be bounded uniformly on +, and a bound on \|u(t)\| is given. This bound implies the relation t ∞\|u(t)\|=0 under suitable conditions on γ(t) and β(t). The basic technical tool in this work is the following nonlinear inequality: g(t)≤ -γ(t)g(t)+α(t,g(t))+β(t),\ t≥ 0; g(0)=g0.