Galois cohomology of reductive algebraic groups over the field of real numbers
Abstract
We describe functorially the first Galois cohomology set H1( R,G) of a connected reductive algebraic group G over the field R of real numbers in terms of a certain action of the Weyl group on the real points of order dividing 2 of the maximal torus containing a maximal compact torus. This result was announced with a sketch of proof in the author's 1988 note. Here we give a detailed proof.
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