Alejandro Adem, Frederick R. Cohen, Enrique Torres-Giese
Published 2008-12-31, updated 2011-09-12Version 4
Using spaces of homomorphisms and the descending central series of the free groups, simplicial spaces are constructed for each integer q>1 and every topological group G, with realizations B(q,G) that filter the classifying space BG. In particular for q=2 this yields a single space B(2,G) assembled from all the n-tuples of commuting elements in G. Homotopy properties of the B(q,G) are considered for finite groups. Cohomology calculations are provided for compact Lie groups. The spaces B(2,G) are described in detail for transitively commutative groups.
Comments: Revised version of original manuscript, to appear in Mathematical Proceedings of the Cambridge Philosophical Society
Commuting Elements and Spaces of Homomorphisms
On spaces of commuting elements in Lie groups
Cohomology and $K$-theory rings of the space of commuting elements in $SU(2)$
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