The bounded slope condition for parabolic equations with time-dependent integrands

Abstract

In this paper, we study the Cauchy-Dirichlet problem equation* \ arrayll ∂t u - div ( D f(t, Du)) = 0 & in T, \\[5pt] u = uo & on ∂P T,\\[5pt] array . equation* where ⊂ Rn is a convex domain, f:[0,T]×Rn → R is L1-integrable in time and convex in the second variable. Assuming that the initial and boundary datum uo:→ R satisfies the bounded slope condition, we prove the existence of a unique variational solution that is Lipschitz continuous in the space variable.