Regularity for the fractional logarithmic p-Laplacian

Abstract

We prove the Harnack inequality (with tails) and local Hölder regularity for the fractional logarithmic p-Laplace operator, which is derived by differentiating the fractional p-Laplace operator with respect to its order. To be more precise, for a suitable function u, the operator reads as the first order derivative align* (-Δp)s+ u:= d dt(-Δp)t u |t=s align* at any arbitrary order s∈ (0, 1). The kernel of this operator involves a logarithmic factor that changes sign at large scales and, near the diagonal, is more singular than the kernel of the fractional p-Laplacian. To achieve our regularity estimates, we adopt the classical De Giorgi-Nash-Moser techniques in this setting. We also construct an example showing that the Harnack inequality fails without tail terms. Our results are new even in the linear setup p=2.

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