Gaussian heat kernel bounds through elliptic Moser iteration

Frédéric Bernicot, Thierry Coulhon*, Dorothee Frey

*Corresponding author for this work

    Research output: Contribution to journalArticlepeer-review

    19 Citations (Scopus)

    Abstract

    On a doubling metric measure space endowed with a “carré du champ”, we consider Lp estimates (Gp) of the gradient of the heat semigroup and scale-invariant Lp Poincaré inequalities (Pp). We show that the combination of (Gp) and (Pp) for p≥2 always implies two-sided Gaussian heat kernel bounds. The case p=2 is a famous theorem of Saloff-Coste, of which we give a shorter proof, without parabolic Moser iteration. We also give a more direct proof of the main result in [37]. This relies in particular on a new notion of Lp Hölder regularity for a semigroup and on a characterisation of (P2) in terms of harmonic functions.

    Original languageEnglish
    Pages (from-to)995-1037
    Number of pages43
    JournalJournal des Mathematiques Pures et Appliquees
    Volume106
    Issue number6
    DOIs
    Publication statusPublished - 1 Dec 2016

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