Asymptotic for a semilinear hyperbolic equation with asymptotically vanishing damping term, convex potential, and integrable source

Abstract

We investigate the long time behavior of solutions to semilinear hyperbolic equation (Eα): u(t)+γ(t)u(t)+Au(t)+f(u(t))=g(t),~t≥0, where A is a self-adjoint nonnegative operator, f a function which derives from a convex function, and γ a nonnegative function which behaviors, for t large enough, as Ktα with K>0 and α ∈0,1[. We obtain sufficient conditions on the source term g(t), ensuring the weak or the strong convergence of any solution u(t) of (Eα) as t→+∞ to a solution of the stationary equation Av+f(v)=0 if one exists.