Please use this identifier to cite or link to this item: http://repo.lib.jfn.ac.lk/ujrr/handle/123456789/9311
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dc.contributor.authorKannan, K.-
dc.date.accessioned2023-04-17T04:27:58Z-
dc.date.available2023-04-17T04:27:58Z-
dc.date.issued2020-
dc.identifier.issn1857-8365 (printed)-
dc.identifier.urihttp://repo.lib.jfn.ac.lk/ujrr/handle/123456789/9311-
dc.description.abstractWe will study the invariant approximation property in various con texts. An interesting question, which we will address next is the behavior of this property with respect to group extensions. To prepare for that we first study a relationship of uniform Roe algebras attached to coarsely equivalent metric spaces in the following case. Let X be a bounded geometry metric space and assume that there is a bijective coarse equivalence φ : X −→ Y × N, where N is a finite metric space. Then there is an isomorphism C ∗ u (X) ∼= C ∗ u (Y ) ⊗ C ∗ u (N) ∼= C ∗ u (Y ) ⊗ Mn(C), where n = |N|. We shall use this result to prove that the invariant approxi mation property is preserved under taking direct product with a finite group : let H be a discrete group with the IAP and K a finite group. Then the direct product G = H × K has IAP.en_US
dc.language.isoenen_US
dc.publisherAdvances in Mathematics: Scientific Journal 9en_US
dc.titleInvariant approximation property for direct product with a finite groupen_US
dc.typeArticleen_US
dc.identifier.doihttps://doi.org/10.37418/amsj.9.10.10en_US
Appears in Collections:Mathematics and Statistics

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