Stability of solutions to some abstract evolution equations with delay

Abstract

The global existence and stability of the solution to the delay differential equation (*)u = A(t)u + G(t,u(t-τ)) + f(t), t 0, u(t) = v(t), -τ t 0, are studied. Here A(t):H H is a closed, densely defined, linear operator in a Hilbert space H and G(t,u) is a nonlinear operator in H continuous with respect to u and t. We assume that the spectrum of A(t) lies in the half-plane λ γ(t), where γ(t) is not necessarily negative and \|G(t,u)\| α(t)\|u\|p, p>1, t 0. Sufficient conditions for the solution to the equation to exist globally, to be bounded and to converge to zero as t tends to ∞, under the non-classical assumption that γ(t) can take positive values, are proposed and justified.