Regularity and symmetry results for the vectorial p-Laplacian

Abstract

We obtain some regularity results for solutions to vectorial p-Laplace equations - p u=- div(|D u|p-2D u) = f(x, u)\,\, in \,. More precisely we address the issue of second order estimates for the stress field. As a consequence of our regularity results we deduce a weighted Sobolev inequality that leads to weak comparison principles. As a corollary we run over the moving plane technique to deduce symmetry and monotonicity results for the solutions, under suitable assumptions.

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