Large-data global solutions to a quasilinear model for viscuos acoustic wave propagation in a non-isothermal setting

Abstract

The manuscript considers the model for conversion of mechanical energy into heat during acoustic wave propagation in the presence of temperature-dependent elastic parameters, as given by \[ \ arrayl utt = (γ() uxt)x + a (γ() ux)x, \\[1mm] t = Dxx + γ() uxt2. array . () \] It is firstly shown that when considered along with no-flux boundary conditions in an open bounded real interval , under the assumption that γ∈ C2([0,∞)) is such that γ>0 and γ' 0 on [0,∞) as well as \[ D· (γ+D) · γ'' + 2γ γ'2 0 on [0,∞), \] for all suitably regular initial data this problem admits a globally defined classical solution. This complements recent findings in the literature, according to which () may admit solutions blowing up in finite time whenever γ is positive and nondecreasing on [0,∞) with ∫0∞ dγ() < ∞. Apart from that, it is found that if the additional assumption \[ a||2 π2 γ(0)1+1+γ(0)D \] is satisfied, the all these solutions stabilize toward some spatially homogeneous equilibrium in the large time limit.