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Besov class via heat semigroup on Dirichlet spaces I: Sobolev type inequalities

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arxiv 1811.04267 v4 pith:X5GW36G6 submitted 2018-11-10 math.FA math-phmath.APmath.MGmath.MPmath.PR

Besov class via heat semigroup on Dirichlet spaces I: Sobolev type inequalities

classification math.FA math-phmath.APmath.MGmath.MPmath.PR
keywords heatsemigroupspacesbesovclassesdirichletgeneralinequalities
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We introduce heat semigroup-based Besov classes in the general framework of Dirichlet spaces. General properties of those classes are studied and quantitative regularization estimates for the heat semigroup in this scale of spaces are obtained. As a highlight of the paper, we obtain a far reaching $L^p$-analogue, $p \ge 1$, of the Sobolev inequality that was proved for $p=2$ by N. Varopoulos under the assumption of ultracontractivity for the heat semigroup. The case $p=1$ is of special interest since it yields isoperimetric type inequalities.

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