English

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

Analysis of PDEs 2016-02-22 v2 Classical Analysis and ODEs Functional Analysis Probability

Abstract

We study one-sided nonlocal equations of the form x0u(x)u(x0)(xx0)1+αdx=f(x0),\int_{x_0}^\infty\frac{u(x)-u(x_0)}{(x-x_0)^{1+\alpha}} dx=f(x_0), on the real line. Notice that to compute this nonlocal operator of order 0<α<10<\alpha<1 at a point x0x_0 we need to know the values of u(x)u(x) to the right of x0x_0, that is, for xx0x\geq x_0. 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.

Keywords

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

R2 v1 2026-06-22T09:32:50.467Z