Elements of finite order in the normalizer of a maximal torus of a semisimple group
Abstract
We prove that the set of elements of a given finite order in the connected component Nw of the normalizer NG(T) of a maximal torus T of a semisimple group G is either empty or a disjoint union of finitely many irreducible subvarieties Ci. The dimension of each Ci equals the dimension of the subspace of fixed vectors for the action of the element w of the Weyl group W corresponding to the component Nw. Moreover, each Ci is an orbit of the action of the torus T on the component Nw by conjugation.
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