On the H\"older regularity for the fractional Schr\"odinger equation and its improvement for radial data

Abstract

We consider the linear, time-independent fractional Schr\"odinger equation (-)s +V=f. We are interested in the local H\"older exponents of distributional solutions , assuming local Lp integrability of the functions V and f. By standard arguments, we obtain the formula 2s-N/p for the local H\"older exponent of where we take some extra care regarding endpoint cases. For our main result, we assume that V and f (but not necessarily ) are radial functions, a situation which is commonplace in applications. We find that the regularity theory "becomes one-dimensional" in the sense that the H\"older exponent improves from 2s-N/p to 2s-1/p away from the origin. Similar results hold for ∇ as well.