A simple model for one-dimensional nonlinear thermoelasticity: Well-posedness in rough-data frameworks

Abstract

In an open bounded interval , the problem \[ utt = uxx - (f())x, t = xx - f() uxt, \] is considered under the boundary conditions u|∂=x|∂=0, and for f∈ C2([0,∞)) satisfying f(0)=0, f'>0 on [0,∞) and f'∈ W1,∞((0,∞)). In the sense of unconditional global existence, uniqueness and continuous dependence, this problem is shown to be well-posed within ranges of initial data merely satisfying \[ u0∈ W01,2(), u0t ∈ L2() and 0 ∈ L2() with 0 a.e.~in , \] and in classes of solutions fulfilling \[ u∈ C0([0,∞);W01,2()), ut ∈ C0([0,∞);L2()) and ∈ C0([0,∞);L2()) L2loc([0,∞);W1,2()). \]