Gradient estimates for the fractional p-Poisson equation

Abstract

We consider local weak solutions to the fractional p-Poisson equation of order s, i.e. ( - p)s u = f. In the range p>1 and s∈ (p-1p,1) we prove Calder\'on & Zygmund type estimates at the gradient level. More precisely, we show for any q>1 that equation* f∈ Lqpp-1 loc ∇ u∈ Lqp loc. equation* The qualitative result is accompanied by a local quantitative estimate.

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