Solutions of the fractional 1-Laplacian: existence, asymptotics and flatness results
Abstract
In this paper, we study the existence of solutions of the equation (-)1s u=f in a bounded open set with Lipschitz boundary ⊂ , vanishing on , for some given s∈ (0,1), and asymptotics as p 1 of solutions of (-)ps u=f. We obtain existence and convergence by comparing the Lns norm of f to the sharp fractional Sobolev constant, or, when f is non-negative, the weighted fractional Cheegar constant to 1 -- in this case, the results are sharp. We further prove that solutions are "flat" on sets of positive Lebesgue measure.
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