On Hopf's Lemma for sign-changing supersolutions to fractional Laplacian equations
Abstract
In this paper we investigate the validity of Hopf's Lemma for a (possibly sign-changing) function u ∈ Hs0() satisfying \[ (-)s u(x) ≥ c(x)u(x) in ,\] where ⊂ RN is an open, bounded domain, c ∈ L∞(), and (-)s u is the fractional Laplacian of u. We show that, under suitable assumptions, the validity of Hopf's Lemma for u at a point x0 ∈ ∂ is essentially equivalent to the validity of Hopf's Lemma for the Caffarelli-Silvestre extension of u at the point (x0,0) ∈ RN × R+. We also provide a slightly more precise characterization of a dichotomy result stated in a recent paper by Dipierro, Soave and Valdinoci.
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