On the MGT equation with memory of type II

Abstract

We consider the Moore-Gibson-Thompson equation with memory of type II ∂ttt u(t) + α ∂tt u(t) + β A ∂t u(t) + γ Au(t)-∫0t g(t-s) A ∂t u(s) d s=0 where A is a strictly positive selfadjoint linear operator (bounded or unbounded) and α,β,γ>0 satisfy the relation γ≤αβ. First, we prove a well-posedness result without requiring any restriction on the total mass of g. Then we show that it is always possible to find memory kernels g, complying with the usual mass restriction <β, such that the equation admits solutions with energy growing exponentially fast. In particular, this provides the answer to a question raised in "F. Dell'Oro, I. Lasiecka, V. Pata, J. Differential Equations 261 (2016), 4188-4222".