From conjugacy classes in the Weyl group to unipotent classes, III
Abstract
Let G be an affine algebraic group over an algebraically closed field such that the identity component G0 of G is reductive. Let W be the Weyl group of G and let D be a connected component of G whose image in G/G0 is a unipotent element. In this paper we define a map from the set of "twisted conjugay classes" in W to the set of unipotent G0-conjugacy classes in D, generalizing an earlier construction which applied when G is connected.
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