Fractional differentiability for solutions of the inhomogenous p-Laplace system

Abstract

It is shown that if p 3 and u ∈ W1,p(,RN) solves the inhomogenous p-Laplace system \[ div (|∇ u|p-2 ∇ u) = f, f ∈ W1,p'(,RN), \] then locally the gradient ∇ u lies in the fractional Nikol'skii space Nθ,2/θ with any θ ∈ [ 2p, 2p-1 ). To the author's knowledge, this result is new even in the case of p-harmonic functions, slightly improving known N2/p,p estimates. The method used here is an extension of the one used by A. Cellina in the case 2 p < 3 to show W1,2 regularity.