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On singularity of energy measures for symmetric diffusions with full off-diagonal heat kernel estimates

Naotaka Kajino, Mathav Murugan

2020The Annals of Probability21 citationsDOIOpen Access PDF

Abstract

We show that, for a strongly local, regular symmetric Dirichlet form over a complete, locally compact geodesic metric space, full off-diagonal heat kernel estimates with walk dimension strictly larger than two (sub-Gaussian estimates) imply the singularity of the energy measures with respect to the symmetric measure, verifying a conjecture by M. T. Barlow in (Contemp. Math. 338 (2003) 11–40). We also prove that in the contrary case of walk dimension two, that is, where full off-diagonal Gaussian estimates of the heat kernel hold, the symmetric measure and the energy measures are mutually absolutely continuous in the sense that a Borel subset of the state space has measure zero for the symmetric measure if and only if it has measure zero for the energy measures of all functions in the domain of the Dirichlet form.

Topics & Concepts

MathematicsHeat kernelDirichlet formMeasure (data warehouse)Gaussian measureMathematical analysisSymmetric spaceDiagonalProbability measureSingularityMetric (unit)Lebesgue measureKernel (algebra)Pure mathematicsGaussianDirichlet distributionGeometryComputer scienceDatabaseQuantum mechanicsBoundary value problemPhysicsEconomicsLebesgue integrationOperations managementGeometric Analysis and Curvature FlowsNonlinear Partial Differential EquationsGeometry and complex manifolds