On the component group of a real reductive group
Abstract
For a connected linear algebraic group G defined over R, we compute the component group π0G(R) of the real Lie group G(R) in terms of a maximal split torus Ts⊂eq G. In particular, we recover a theorem of Matsumoto (1964) that each connected component of G(R) intersects Ts(R). We provide explicit elements of Ts(R) which represent all connected components of G(R). The computation is based on structure results for real loci of algebraic groups and on methods of Galois cohomology.
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