Lipschitz bounds for nonuniformly elliptic integral functionals in the plane

Abstract

We study local regularity properties of local minimizer of scalar integral functionals with controlled (p,q)-growth in the two-dimensional plane. We establish Lipschitz continuity for local minimizer under the condition 1<p≤ q<∞ with q<3p which improve upon the classical results valid in the regime q<2p. Along the way, we establish an L∞-L2-estimate for solutions of linear uniformly elliptic equations in the plane which is optimal with respect to the ellipticity contrast of the coefficients.