Open AccessOn spectra of Koopman, groupoid and quasi-regular representations
Author(s) -
Artem Dudko,
Rostislav Grigorchuk
Publication year - 2017
Publication title -
journal of modern dynamics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.668
H-Index - 25
eISSN - 1930-532X
pISSN - 1930-5311
DOI - 10.3934/jmd.2017005
Subject(s) - mathematics , ergodic theory , pure mathematics , countable set , disjoint sets , second countable space , pairwise comparison , action (physics) , regular representation , double groupoid , corollary , group (periodic table) , disjoint union (topology) , representation (politics) , discrete mathematics , statistics , physics , chemistry , organic chemistry , quantum mechanics , politics , political science , law
In this paper we investigate relations between Koopman, groupoid and quasi-regular representations of countable groups. We show that for an ergodic measure class preserving action of a countable group G on a standard Borel space the associated groupoid and quasi-regular representations are weakly equivalent and weakly contained in the Koopman representation. Moreover, if the action is hyperfinite then the Koopman representation is weakly equivalent to the groupoid. As a corollary of our results we obtain a continuum of pairwise disjoint pairwise equivalent irreducible representations of weakly branch groups. As an illustration we calculate spectra of regular, Koopman and groupoid representations associated to the action of the 2-group of intermediate growth constructed by the second author in 1980.
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