Regularity results for segregated configurations involving fractional Laplacian

Abstract

We study the regularity of segregated profiles arising from competition - diffusion models, where the diffusion process is of nonlocal type and is driven by the fractional Laplacian of power s ∈ (0,1). Among others, our results apply to the regularity of the densities of an optimal partition problem involving the eigenvalues of the fractional Laplacian. More precisely, we show C0,α* regularity of the density, where the exponent α* is explicit and is given by equation* α* = cases s & for s ∈ (0,1/2]\\ 2s-1 &for s ∈ (1/2,1].cases equation* Under some additional assumptions, we then show that solutions are C0,s. These results are optimal in the class of H\"older continuous functions. Thus, we find a complete correspondence with known results in case of the standard Laplacian.