Boundary regularity for parabolic systems with nonstandard (p,q)-growth conditions in smooth convex domains

Abstract

We study the boundary regularity of local weak solutions to nonlinear parabolic systems of the form equation* ∂t ui - div ( a(|Du|) Dui )= fi, i=1,…,N, equation* in a space-time cylinder T = × (0,T), where ⊂ Rn (n ≥ 2) is a bounded, convex C2-domain and T>0. The inhomogeneity f=(f1,…,fN) belongs to Ln+2+σ(T,RN) for some σ>0. The coefficients a R>0 R>0 are of Uhlenbeck-type and satisfy a nonstandard (p,q)-growth condition with \[ 2 ≤ p ≤ q < p + 4n+2. \] Our main result establishes a local Lipschitz estimate up to the lateral boundary for any local weak solution that vanishes on the lateral boundary of the cylinder.