Spectral multiplier theorem and sub-Gaussian heat kernel estimates

Peng Chen; Xixi Lin

doi:10.4064/cm8681-11-2021

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Spectral multiplier theorem and sub-Gaussian heat kernel estimates

Volume 170 / 2022

Peng Chen, Xixi Lin Colloquium Mathematicum 170 (2022), 193-210 MSC: Primary 42B15; Secondly 42B20, 47F05. DOI: 10.4064/cm8681-11-2021 Published online: 20 May 2022

Abstract

We study general spectral multiplier theorems for nonnegative self-adjoint operators on spaces of homogeneous type. We show that a Hörmander type spectral multiplier theorem follows from sub-Gaussian upper bounds for the corresponding heat kernel. Our result can be applied to fractal manifolds and quantum graphs.

Authors

Peng ChenDepartment of Mathematics
Sun Yat-sen University
Guangzhou, 510275, P.R. China
e-mail
Xixi LinDepartment of Mathematics
Sun Yat-sen University
Guangzhou, 510275, P.R. China
e-mail

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Publishing house / Journals and Serials / Colloquium Mathematicum / All issues

Colloquium Mathematicum

Spectral multiplier theorem and sub-Gaussian heat kernel estimates

Volume 170 / 2022

Abstract

Authors

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