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Functional Analysis
[161]
Quasi-range-preserving operator
Lai Chunhui
Minnan Normal University
Functional Analysis
mathscidoc:1612.12003
Northeast. Math. J., 10, (3), 285–290, 1994.10
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This paper introduces a new concept, the quasi-range-preserving operator, and gives necessary and sufficient conditions for a linear operator to be quasi-range-preserving. As a special case Glicksberg's problem is affirmatively answered.
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[162]
Two-sided estimates of heat kernels of jump type Dirichlet forms
Alexander Grigor'yan
Universität Bielefeld
Eryan Hu
Universität Bielefeld
Jiaxin Hu
Tsinghua University
Functional Analysis
mathscidoc:1612.12002
Adv. Math., 330, 433--515, 2018
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[163]
Lower estimates of heat kernels for non-local Dirichlet forms on metric measure spaces
Alexander Grigor'yan
Universität Bielefeld
Eryan Hu
Universität Bielefeld
Jiaxin Hu
Tsinghua University
Functional Analysis
mathscidoc:1612.12001
Journal of Functional Analysis, 272, (8), 3311–3346, 2017
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[164]
The Davies method revisited for heat kernel upper bounds of regular Dirichlet forms on metric measure spaces
Jiaxin Hu
Tsinghua University
Xuliang Li
Tsinghua University
Functional Analysis
mathscidoc:1611.12002
preprint, 2016
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[165]
Generalized capacity, Harnack inequality and heat kernels on metric spaces
Alexander Grigor'yan
Universität Bielefeld, Germany
Jiaxin Hu
Tsinghua University,China
Ka-Sing Lau
The Chines University of Hong Kong
Functional Analysis
mathscidoc:1611.12001
J. Math. Soc. Japan. Special Issue dedicated to Kiyosi Itō, 67, 1485-1549 , 2015
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