p-Transience and p-Hyperbolicity of Submanifolds

Ilkka Holopainen, Steen Markvorsen, Vicente Palmer

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    Abstract

    We use drifted Brownian motion in warped product model spaces as comparison constructions to show $p$-hyperbolicity of a large class of submanifolds for $p\ge 2$. The condition for $p$-hyperbolicity is expressed in terms of upper support functions for the radial sectional curvatures of the ambient space and for the radial convexity of the submanifold. In the process of showing $p$-hyperbolicity we also obtain explicit lower bounds on the $p$-capacity of finite annular domains of the submanifolds in terms of the drifted $2$-capacity of the corresponding annuli in the respective comparison spaces.
    Original languageEnglish
    Place of PublicationDepartment of Mathematics, DTU
    PublisherDepartment of Mathematics, Technical University of Denmark
    Number of pages17
    Publication statusPublished - 2006
    SeriesMat-Report
    Number2006-18

    Keywords

    • p-Transience, p-hyperbolicity
    • Submanifolds
    • Comparison theory

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