Please use this identifier to cite or link to this item: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/4920
Title: An optimal improvement for the Hardy inequality on the hyperbolic space and related manifolds
Authors: Berchio, Elvise
GANGULY, DEBDIP
Grillo, Gabriele
Pinchover, Yehuda
Dept. of Mathematics
Keywords: Hyperbolic space
Optimal Hardy inequality
Extremals
TOC-JUL-2020
2020
2020-JUL-WEEK5
Issue Date: Aug-2020
Publisher: Cambridge University Press
Citation: Proceedings of the Royal Society of Edinburgh Section A: Mathematics, 150(4), 1699-1736.
Abstract: We prove optimal improvements of the Hardy inequality on the hyperbolic space. Here, optimal means that the resulting operator is critical in the sense of Devyver, Fraas, and Pinchover (2014), namely the associated inequality cannot be further improved. Such inequalities arise from more general, optimal ones valid for the operator where 0 ⩽ λ ⩽ λ1(ℍN) and λ1(ℍN) is the bottom of the L2 spectrum of , a problem that had been studied in Berchio, Ganguly, and Grillo (2017) only for the operator . A different, critical and new inequality on ℍN, locally of Hardy type is also shown. Such results have in fact greater generality since they are proved on general Cartan-Hadamard manifolds under curvature assumptions, possibly depending on the point. Existence/nonexistence of extremals for the related Hardy-Poincaré inequalities are also proved using concentration-compactness technique and a Liouville comparison theorem. As applications of our inequalities, we obtain an improved Rellich inequality and we derive a quantitative version of Heisenberg-Pauli-Weyl uncertainty principle for the operator
URI: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/4920
https://doi.org/10.1017/prm.2018.139
ISSN: 0308-2105
1473-7124
Appears in Collections:JOURNAL ARTICLES

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