Non-local tug-of-war with noise for the geometric fractional $p$-Laplacian

Abstract: This paper concerns the fractional p-Laplace operator ∆ s p in non-divergence form, which has been introduced in [2]. For any p ∈ [2, ∞) and s ∈ ( 1 2 , 1) we first define two families of non-local, non-linear averaging operators, parametrised by ε and defined for all bounded, Borel functions u : R N → R. We prove that ∆ s p u(x) emerges as the ε 2s -order coefficient in the expansion of the deviation of each ε-average from the value u(x), in the limit of the domain of averaging exhausting an appropriate cone … Show more