H\"older continuity of quasiminimizers with nonstandard growth

Abstract

We show the H\"older continuity of quasiminimizers of the energy functionals ∫ f(x,u,∇ u)\,dx with nonstandard growth under the general structure conditions |z|p(x) - b(x)|y|r(x)-g(x) ≤ f(x,y,z) ≤ μ|z|p(x) + b(x)|y|r(x) + g(x). The result is illustrated by showing that weak solutions to a class of (A,B)-harmonic equations - div A(x,u,∇ u) = B(x,u,∇ u), are quasiminimizers of the variational integral of the above type and, thus, are H\"older continuous. Our results extend works by Chiad\`o Piat-Coscia, Fan-Zhao and Giusti-Giaquinta.