On the interplay between (p,q)-growth and x-dependence of the energy integrand: a limit case

Abstract

We establish the local Lipschitz regularity of the local minimizers of non autonomous integral funtionals of the form \[ ∫ F(x, Dz)\,dx, \] where is a bounded open set of Rn, n 2. The energy density F(x,) satisfies (p,q)-growth conditions with respect to the gradient variable and belongs to the Sobolev class W1,φ, with φ(t)=trα(e+t), r n, α 0, as a function of the x variable, under the condition 1qp 1 + 1n - 1r. We present a unified approach that covers the limit case qp = 1 + 1n - 1r and retrieves the results in EMM16 and in CGHPdN20.