Maximal regularity for local minimizers of non-autonomous functionals

Abstract

We establish local C1,α-regularity for some α∈(0,1) and Cα-regularity for any α∈(0,1) of local minimizers of the functional \[ v\ \ ∫ φ(x,|Dv|)\,dx, \] where φ satisfies a (p,q)-growth condition. Establishing such a regularity theory with sharp, general conditions has been an open problem since the 1980s. In contrast to previous results, we formulate the continuity requirement on φ in terms of a single condition for the map (x,t) φ(x,t), rather than separately in the x- and t-directions. Thus we can obtain regularity results for functionals without assuming that the gap qp between the upper and lower growth bounds is close to 1. Moreover, for φ(x,t) with particular structure, including p-, Orlicz-, p(x)- and double phase-growth, our single condition implies known, essentially optimal, regularity conditions. Hence, we handle regularity theory for the above functional in a universal way.