Optimal elliptic regularity: a comparison between local and nonlocal equations
Abstract
Given L≥ 1, we discuss the problem of determining the highest α=α(L) such that any solution to a homogeneous elliptic equation in divergence form with ellipticity ratio bounded by L is in Cα loc. This problem can be formulated both in the classical and non-local framework. In the classical case it is known that α(L) exp(-CLβ), for some C, β≥ 1 depending on the dimension N≥ 3. We show that in the non-local case, α(L) L-1-δ for all δ>0.
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