The Index Theorem of topological regular variation and its applications |
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| Authors: | N.H. Bingham A.J. Ostaszewski |
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| Affiliation: | a Mathematics Department, Imperial College London, London SW7 2AZ, United Kingdom
b Mathematics Department, London School of Economics, Houghton Street, London WC2A 2AE, United Kingdom |
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| Abstract: | We develop further the topological theory of regular variation of [N.H. Bingham, A.J. Ostaszewski, Topological regular variation: I. Slow variation, LSE-CDAM-2008-11]. There we established the uniform convergence theorem (UCT) in the setting of topological dynamics (i.e. with a group T acting on a homogenous space X), thereby unifying and extending the multivariate regular variation literature. Here, working with real-time topological flows on homogeneous spaces, we identify an index of regular variation, which in a normed-vector space context may be specified using the Riesz representation theorem, and in a locally compact group setting may be connected with Haar measure. |
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| Keywords: | Multivariate regular variation Uniform convergence theorem Topological dynamics Flows Cocycles Representation theorems |
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