Local strong solutions in a quasilinear Moore-Gibson-Thompson type model for thermoviscoelastic evolution in a standard linear solid

Abstract

This manuscript is concerned with the evolution system \[ \ arrayl uttt + α utt = (γ() uxt)x + ( γ() ux)x, t = D xx + () uxt2, array . \] which arises as a simplified model for heat generation during acoustic wave propagation in a one-dimensional viscoelastic medium of standard linear solid type. Under the assumptions that D>0 and α 0, and that γ, γ and are sufficiently smooth with γ>0, γ>0 and 0 on [0,∞), for suitably regular initial data a statement on local existence and uniqueness of solutions in an associated Neumann problem is derived in a suitable framework of strong solvability.