Existence of large-data global weak solutions to a model of a strain-limiting viscoelastic body

Abstract

We prove the existence of a unique large-data global-in-time weak solution to a class of models of the form utt = div(T) + f for viscoelastic bodies exhibiting strain-limiting behaviour, where the constitutive equation, relating the linearised strain tensor ε(u) to the Cauchy stress tensor T, is assumed to be of the form ε(ut) +α ε(u)= F(T), where we define F(T) = (1 + |T|a)-1aT, for constant parameters α ∈ (0, ∞) and a∈ (0, ∞), in any number d of space dimensions, with periodic boundary conditions. The Cauchy stress T is show to belong to L1(Q)d× d over the space-time domain Q. In particular, in three space dimensions, if a∈ (0, 27), then in fact T∈ L1+δ(Q)d× d for a δ>0, the value of which depends only on a.