Stability of solutions to abstract differential equations

Abstract

A sufficient condition for asymptotic stability of the zero solution to an abstract nonlinear evolution problem is given. The governing equation is u=A(t)u+F(t,u), where A(t) is a bounded linear operator in Hilbert space H and F(t,u) is a nonlinear operator, \|F(t,u)\|≤ c0\|u\|1+p, p=const >0, c0=const>0. It is not assumed that the spectrum σ:=σ(A(t)) of A(t) lies in the fixed halfplane Rez≤ -, where >0 does not depend on t. As t ∞ the spectrum of A(t) is allowed to tend to the imaginary axis.