Sobolev algebras through heat kernel estimates
Abstract
On a doubling metric measure space endowed with a "carr\'e du champ", let be the associated Markov generator and the corresponding homogeneous Sobolev space of order in , , with norm . We give sufficient conditions on the heat semigroup for the spaces to be algebras for the pointwise product. Two approaches are developed, one using paraproducts (relying on extrapolation to prove their boundedness) and a second one through geometrical square functionals (relying on sharp estimates involving oscillations). A chain rule and a paralinearisation result are also given. In comparison with previous results ([29,11]), the main improvements consist in the fact that we neither require any Poincar\'e inequalities nor -boundedness of Riesz transforms, but only -boundedness of the gradient of the semigroup. As a consequence, in the range , the Sobolev algebra property is shown under Gaussian upper estimates of the heat kernel only.
Cite
@article{arxiv.1505.01442,
title = {Sobolev algebras through heat kernel estimates},
author = {Frédéric Bernicot and Thierry Coulhon and Dorothee Frey},
journal= {arXiv preprint arXiv:1505.01442},
year = {2015}
}
Comments
62 pages