English

Sobolev algebras through heat kernel estimates

Classical Analysis and ODEs 2015-05-07 v1 Functional Analysis

Abstract

On a doubling metric measure space (M,d,μ)(M,d,\mu) endowed with a "carr\'e du champ", let L\mathcal{L} be the associated Markov generator and L˙αp(M,L,μ)\dot L^{p}_\alpha(M,\mathcal{L},\mu) the corresponding homogeneous Sobolev space of order 0<α<10<\alpha<1 in LpL^p, 1<p<+1<p<+\infty, with norm Lα/2fp\left\|\mathcal{L}^{\alpha/2}f\right\|_p. We give sufficient conditions on the heat semigroup (etL)t>0(e^{-t\mathcal{L}})_{t>0} for the spaces L˙αp(M,L,μ)L(M,μ)\dot L^{p}_\alpha(M,\mathcal{L},\mu) \cap L^\infty(M,\mu) 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 LpL^p-boundedness of Riesz transforms, but only LpL^p-boundedness of the gradient of the semigroup. As a consequence, in the range p(1,2]p\in(1,2], the Sobolev algebra property is shown under Gaussian upper estimates of the heat kernel only.

Keywords

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

R2 v1 2026-06-22T09:29:14.799Z