Mikhail Borovoi, Dmitry A. Timashev
Published 2021-10-25, updated 2022-02-09Version 2
Let G be a connected reductive group over the field of real numbers R. Using results of our previous joint paper, we compute combinatorially the first Galois cohomology set H^1(R,G) in terms of reductive Kac labelings. Moreover, we compute the group of connected components \pi_0 G(R) of the real Lie group G(R) and the maps in exact sequences containing \pi_0 G(R) and H^1(R,G).
Comments: V.1: 35 pages, v.2: 41 pages
On the component group of a real reductive group
Galois cohomology of real semisimple groups via Kac labelings
Galois cohomology of reductive algebraic groups over the field of real numbers
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