Twisted Weyl groups of Lie groups and nonabelian cohomology
Abstract
For a cyclic group A and a connected Lie group G with an A-module structure (with the additional conditions that G is compact and the A-module structure on G is 1-semisimple if A), we define the twisted Weyl group W=W(G,A,T), which acts on T and H1(A,T), where T is a maximal compact torus of G0A, the identity component of the group of invariants GA. We then prove that the natural map W H1(A,T) H1(A,G) is a bijection, reducing the calculation of H1(A,G) to the calculation of the action of W on T. We also prove some properties of the twisted Weyl group W, one of which is that W is a finite group. A new proof of a known result concerning the ranks of groups of invariants with respect to automorphisms of a compact Lie group is also given.
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