Please use this identifier to cite or link to this item: http://repo.lib.jfn.ac.lk/ujrr/handle/123456789/3523
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dc.contributor.authorKannan, K.
dc.date.accessioned2021-07-14T05:21:17Z
dc.date.accessioned2022-07-07T07:14:34Z-
dc.date.available2021-07-14T05:21:17Z
dc.date.available2022-07-07T07:14:34Z-
dc.date.issued2012
dc.identifier.issn2279-1922
dc.identifier.urihttp://repo.lib.jfn.ac.lk/ujrr/handle/123456789/3523-
dc.description.abstractRapid decay property (property (RD)) for groups, generalizes Haagerup’s inequality for free groups and so for example of free groups have property RD. Property RD provides estimates for the operator norm of those functions (in the left-regular representation) in terms of the Sobolev norm. Even more, property RD is the noncommutative analogue of the fact that smooth functions are continuous. This property RD for groups has deep implications for the analytical, topological and geometric aspects of groups. It has been proved that groups of polynomial growth and classical hyperbolic groups have property RD, and the only amenable discrete groups that have property RD are groups of polynomial growth. He also showed that many groups, for instance 𝑆𝐿3(ℤ), do not have the Rapid Decay property. Examples of RD groups include group acting on CAT(0)-cube complexes, hyperbolic groups of Gromov, Coxeter groups, and torus knot groups. The symmetry group of a tiling pattern of the plane is called a crystallographic group. The discrete Heisenberg group is the multiplicative group Η3 of all matrices of the formen_US
dc.language.isoenen_US
dc.publisherUniversity of Jaffnaen_US
dc.subjectProperty RDen_US
dc.subjectThe Crystallographic groupsen_US
dc.subjectThe Discrete Heisenberg Groupen_US
dc.titleIdentification of Two Groups with the Rapid Decay Propertyen_US
dc.typeArticleen_US
Appears in Collections:JUICE 2012

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