Homotopy type of the unitary group of the uniform Roe algebra on Zn
Abstract
We study the homotopy type of the space of the unitary group 1(Cu(|Zn|)) of the uniform Roe algebra Cu(|Zn|) of Zn. We show that the stabilizing map 1(Cu(|Zn|))∞(Cu(|Zn|)) is a homotopy equivalence. Moreover, when n=1,2, we determine the homotopy type of 1(Cu(|Zn|)), which is the product of the unitary group 1(C(|Zn|)) (having the homotopy type of ∞(C) or Z× B∞(C) depending on the parity of n) of the Roe algebra C(|Zn|) and rational Eilenberg--MacLane spaces.
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