Lipschitz regularity of fractional p-Laplacian
Abstract
In this article, we investigate the H\"older regularity of the fractional p-Laplace equation of the form (-p)s u=f where p>1, s∈ (0, 1) and f∈ L∞ loc(). Specifically, we prove that u∈ C0, γ_ loc() for γ=\1, spp-1\, provided that spp-1≠ 1. In particular, it shows that u is locally Lipschitz for spp-1>1. Moreover, we show that for spp-1=1, the solution is locally Lipschitz, provided that f is locally H\"older continuous. Additionally, we discuss further regularity results for the fractional double-phase problems.
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