Units of Z/pZ-equivariant K-theory and bundles of UHF-algebras
Abstract
We consider infinite tensor product actions of G = Z/pZ on the UHF-algebra D = End(V) ∞ for a finite-dimensional unitary G-representation V and determine the equivariant homotopy type of the group Aut(D K), where K are the compact operators on 2(G) H0 for a separable Hilbert space H0 with (H0) = ∞. We show that this group carries an equivariant infinite loop space structure revealing it as the first space of a naive G-spectrum, which we prove to be equivalent to the positive units gl1(KUD)+ of equivariant KUD-theory. Here, KUD is a G-spectrum representing X K*G(C(X) D). As a consequence the first group of the cohomology theory associated to gl1(KUD)+ classifies equivariant D K-bundles over finite CW-complexes.
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