On asymptotic expansions for the fractional infinity Laplacian

Abstract

We propose two asymptotic expansions of two interrelated integral-type averages, in the context of the fractional ∞-Laplacian ∞s for s∈ (12,1). This operator has been introduced and first studied in [Bjorland, C., Caffarelli, L. and Figalli, A., Nonlocal Tug-of-War and the inifnity fractional Laplacian, Comm. Pure Appl. Math., 65, pp. 337--380, (2012)]. Our expansions are parametrised by the radius of the removed singularity ε, and allow for the identification of ∞sφ(x) as the ε2s-order coefficient of the deviation of the ε-average from the value φ(x), in the limit ε 0+. The averages are well posed for functions φ that are only Borel regular and bounded.