The sharp maximal function approach to $L^{p}$ estimates for operators structured on H\"{o}rmander's vector fields
Abstract
We consider a nonvariational degenerate elliptic operator structured on a system of left invariant, 1-homogeneous, H\"ormander's vector fields on a Carnot group in , where the matrix of coefficients is symmetric, uniformly positive on a bounded domain of and the coefficients are bounded, measurable and locally VMO in the domain. We give a new proof of the interior estimates on the second order derivatives with respect to the vector fields, first proved by Bramanti-Brandolini in [Rend. Sem. Mat. dell'Univ. e del Politec. di Torino, Vol. 58, 4 (2000), 389-433], extending to this context Krylov' technique, introduced in [Comm. in P.D.E.s, 32 (2007), 453-475], consisting in estimating the sharp maximal function of the second order derivatives.
Cite
@article{arxiv.1511.03536,
title = {The sharp maximal function approach to $L^{p}$ estimates for operators structured on H\"{o}rmander's vector fields},
author = {Marco Bramanti and Marisa Toschi},
journal= {arXiv preprint arXiv:1511.03536},
year = {2015}
}
Comments
26 pages