Cohomology of Commuting Varieties of Connected Compact Reductive Lie Groups
Abstract
We calculate the rational cohomology of the commuting variety XG, n consisting of n-tuples of commuting elements of a compact reductive group G. This is done by studying a map from a related variety YG, n, which has easily calculated cohomology. The proof studies the fibers of the map and uses the Vietoris-Begle theorem to prove that the induced map on rational cohomology is an isomorphism.
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