A note on limiting Calderon-Zygmund theory for transformed n-Laplace systems in divergence form
Abstract
We consider rotated n-Laplace systems on the unit ball B1 ⊂ Rn of the form align* -div( Q|∇ u|n-2 ∇ u) = div(G), align* where u∈ W1,n(B1;RN), Q∈ W1,n(B1;SO(N)) and G∈ L( nn-1,q )(B1;Rn RN) for some 0<q<nn-1. We prove that ∇ u∈ L(n,q(n-1))loc with estimates. As a corollary, we obtain that solutions to n u ∈ H1, where H1 is the Hardy space, have a higher integrability, namely ∇ u ∈ L(n,n-1)loc.
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