Blow up property for viscoelastic evolution equations on manifolds with conical degeneration

Abstract

This paper is concerned with the study of the nonlinear viscoelastic evolution equation with strong damping and source terms, described by \[utt - Bu + ∫0tg(t-τ)Bu(τ)dτ + f(x)ut|ut|m-2 = h(x)|u|p-2u , 1 cm x∈ intB, t > 0,\] where B is a stretched manifold. First, we prove the solutions of problem 1.1 in cone Sobolev space H1,n22,0(B), admit a blow up in finite time for p > m and positive initial energy. Then, we construct a lower bound for obtained blow up time under appropriate assumptions on data.