Maximum principles, extension problem and inversion for nonlocal one-sided equations

Abstract

We study one-sided nonlocal equations of the form ∫x0∞u(x)-u(x0)(x-x0)1+α dx=f(x0), on the real line. Notice that to compute this nonlocal operator of order 0<α<1 at a point x0 we need to know the values of u(x) to the right of x0, that is, for x≥ x0. We show that the operator above corresponds to a fractional power of a one-sided first order derivative. Maximum principles and a characterization with an extension problem in the spirit of Caffarelli--Silvestre and Stinga--Torrea are proved. It is also shown that these fractional equations can be solved in the general setting of weighted one-sided spaces. In this regard we present suitable inversion results. Along the way we are able to unify and clarify several notions of fractional derivatives found in the literature.