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The classifying space BG of a group G classifies principal G-bundles, in that homotopy classes of maps [X, BG] are naturally identified with isomorphism classes of principal G-bundles P ⭢ X.

12 votes

A question about cohomology of the classifying spaces of compact groups

(Edited per request to add more detail.) Consider first the case $G = U(n)$. If $S^1 \to U(1)^n \subset U(n)$ is injective, with $H^*(BS^1) = Z[t]$, $H^*(BU(1)^n) = Z[t_1, \dots, t_n]$, $H^*(BU(n)) = …
John Rognes's user avatar
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15 votes

What is π_1(BG) for an arbitrary topological group $G$?

The first reference in this general area was: N. E. Steenrod, "Milgram's classifying space of a topological group", Topology 7 (1968) 349–368. Working in the category of compactly generated …
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5 votes

Group completion of a monoid (braid groups)

See Proposition 1 in McDuff, D.; Segal, G. Homology fibrations and the "group-completion'' theorem. Invent. Math. 31 (1975/76), no. 3, 279–284.
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