Title of article
Random walks on the braid group B3 and magnetic translations in hyperbolic geometry Original Research Article
Author/Authors
Raphaël Voituriez، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2002
Pages
14
From page
675
To page
688
Abstract
We study random walks on the three-strand braid group B3, and in particular compute the drift, or average topological complexity of a random braid, as well as the probability of trivial entanglement. These results involve the study of magnetic random walks on hyperbolic graphs (hyperbolic Harper–Hofstadter problem), what enables to build a faithful representation of B3 as generalized magnetic translation operators for the problem of a quantum particle on the hyperbolic plane.
Keywords
Braid groups , Discrete magnetic Schr?dinger operators , Representation theory , Hyperbolic geometry
Journal title
Nuclear Physics B
Serial Year
2002
Journal title
Nuclear Physics B
Record number
883577
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