Computation of the component group of an arbitrary real algebraic group

Abstract

We compute explicitly the group of connected components π0G(R) of the real Lie group G(R) for an arbitrary (not necessarily linear) connected algebraic group G defined over the field R of real numbers. In particular, it turns out that π0G(R) is always an elementary Abelian 2-group. The result looks most transparent in the cases where G is a linear algebraic group or an Abelian variety. The computation is based on structure results on algebraic groups and Galois cohomology methods.

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