Regularity for the fractional p-Laplace equation
Abstract
Higher Sobolev and H\"older regularity is studied for local weak solutions of the fractional p-Laplace equation of order s in the case p 2. Depending on the regime considered, i.e. 0<sp-2p or p-2p<s<1, precise local estimates are proven. The relevant estimates are stable if the fractional order s reaches 1; the known Sobolev regularity estimates for the local p-Laplace are recovered. The case p=2 reproduces the almost W1+s,2 loc-regularity for the fractional Laplace equation of any order s∈(0,1).
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