Global smooth solutions in a one-dimensional thermoviscoelastic model with temperature-dependent paramaters

Abstract

This manuscript is concerned with the system align* \ arrayl utt = (γ() uxt)x + (a(x,t) ux)x +(f())x, \\[1mm] t = Dxx + γ() uxt2 + f() uxt, array . align* which is used to describe thermoviscoelastic developments in one-dimensional Kelvin-Voigt materials. It is assumed that a,γ and f are sufficiently smooth functions that satisfy cγ<γ(ζ)<Cγ, γ''(ζ) 0, f(0)=0, |f'(ζ)| Cf and |f(ζ)| Cf(1+ζ)α for all ζ 0 and some positive constants cγ,Cγ,Cf>0 and α ∈ (0,5/6). Under these conditions, this study then establishes a result on the existence of global classical solutions for sufficiently smooth but arbitrarily large initial data.