Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End
Grigoryan A, Sürig P (2022)
Potential Analysis: 33 Seiten.
Zeitschriftenaufsatz
| Veröffentlicht | Englisch
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Einrichtung
Abstract / Bemerkung
We investigate heat kernel estimates of the form p(t)(x,x) >= c(x)t(-alpha), for large enough t, where alpha and c(x) are positive reals and c(x) may depend on x, on manifolds having at least one end with a polynomial volume growth.
Stichworte
Manifolds with ends;
Heat kernel;
Isoperimetric inequality
Erscheinungsjahr
2022
Zeitschriftentitel
Potential Analysis
Seite(n)
33 Seiten
Urheberrecht / Lizenzen
ISSN
0926-2601
eISSN
1572-929X
Page URI
https://pub.uni-bielefeld.de/record/2966348
Zitieren
Grigoryan A, Sürig P. Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End. Potential Analysis. 2022:33 Seiten.
Grigoryan, A., & Sürig, P. (2022). Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End. Potential Analysis, 33 Seiten. https://doi.org/10.1007/s11118-022-10044-7
Grigoryan, Alexander, and Sürig, Philipp. 2022. “Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End”. Potential Analysis, 33 Seiten.
Grigoryan, A., and Sürig, P. (2022). Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End. Potential Analysis, 33 Seiten.
Grigoryan, A., & Sürig, P., 2022. Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End. Potential Analysis, , p 33 Seiten.
A. Grigoryan and P. Sürig, “Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End”, Potential Analysis, 2022, pp. 33 Seiten.
Grigoryan, A., Sürig, P.: Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End. Potential Analysis. 33 Seiten (2022).
Grigoryan, Alexander, and Sürig, Philipp. “Volume Growth and On-diagonal Heat Kernel Bounds on Riemannian Manifolds with an End”. Potential Analysis (2022): 33 Seiten.
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