Steenrod operations on the Chow ring of a classifying space
Abstract
We use the Steenrod algebra to study CH*BG, the mod p Chow ring of the classifying space of G. We describe a localization property which relates a given G to its elementary abelian subgroups, and we study a number of particular cases, namely symmetric groups and Chevalley groups. It turns out that the Chow rings of these groups are completely determined by the abelian subgroups and their fusion.
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