Nash or Sobolev inequalities are known to be equivalent to ultracontractive
properties of Markov semigroups, hence to uniform bounds on their kernel
densities. In this work we present a simple and extremely general method, based
on weighted Nash inequalities, to obtain non-uniform bounds on the kernel
densities. Such bounds imply a control on the trace or the Hilbert-Schmidt norm
of the heat kernels. We illustrate the method on the heat kernel on $\dR$
naturally associated with the measure with density $C_a\exp(-|x|^a)$, with $

Bakry, Dominique

Bolley, François

Gentil, Ivan

Maheux, Patrick

English

arXiv

International audienceNash or Sobolev inequalities are known to be equivalent to ultracontractive properties of Markov semigroups, hence to uniform bounds on their kernel densities. In this work we present a simple and extremely general method, based on weighted Nash inequalities, to obtain non-uniform bounds on the kernel densities. Such bounds imply a control on the trace or the Hilbert-Schmidt norm of the heat kernels. We illustrate the method on the heat kernel on $\dR$ naturally associated with the measure with density $C_a\exp(-|x|^a)$, with $

Scientific Publications of the University of Toulouse II Le Mirail

Weighted Nash Inequalities

Hal-Diderot

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HAL-INSA Toulouse

HAL Université de Toulouse, et Toulouse INP

Dominique Bakry

François Bolley

Ivan Gentil

Patrick Maheux

Crossref

Revista Matemática Iberoamericana

Weighted Nash inequalities

Weighted Nash Inequalities

Abstract

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