Maximum principles, extension problem and inversion for nonlocal one-sided equations
Abstract
We study one-sided nonlocal equations of the form on the real line. Notice that to compute this nonlocal operator of order at a point we need to know the values of to the right of , that is, for . 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.
Cite
@article{arxiv.1505.03075,
title = {Maximum principles, extension problem and inversion for nonlocal one-sided equations},
author = {A. Bernardis and F. J. Martín-Reyes and P. R. Stinga and J. L. Torrea},
journal= {arXiv preprint arXiv:1505.03075},
year = {2016}
}
Comments
20 pages. To appear in Journal of Differential Equations