Large time stabilization of rough-data solutions in one-dimensional nonlinear thermoelasticity

Abstract

In an open bounded real interval , the model for one-dimensional thermoelasticity given by \[ utt = uxx - (f())x, t = xx - f() uxt, \] is considered along with homogeneous boundary conditions of Dirichlet type for u and of Neumann type for , under the assumption that f∈ C1([0,∞)) satisfies f(0)=0, f'∈ L∞((0,∞)) and f'>0 on [0,∞). The focus is on initial data which are merely required to be consistent with the fundamental principles of energy conservation and entropy nondecrease, by satisfying \[ u0∈ W01,2(), u0t ∈ L2(), 0 0∈ L1(), 0 0. \] Despite an apparent lack of favorable compactness properties that have underlain previous related studies on more regular settings, it is shown that corresponding weak solutions stabilize in the sense that \[ t∞ \|u(·,t)\|L∞()=0 \] and \[ ess \!\!\!\! t∞ \|(·,t)-∞\|L∞()=0 \] with some ∞>0.