Extensions of Algebraic Groups
Abstract
Let G be a connected complex algebraic group and A a connected abelian algebraic group endowed with an algebraic action of G by group automorphisms. In the present note we describe the abelian group alg(G,A) of algebraic group extensions of G by A in terms of a short exact sequence relating the ext-group to a relative second Lie algebra cohomology space and the fundamental group of the commutator group. Our second main result is an analog of the Van-Est Theorem for algebraic group cohomology, saying that for an algebraic G module and p ≥ 0 the algebraic group cohomology Hpalg(G,) is given by the relative cohomology of the Lie algebra with respect to the Lie algebra of a maximal reductive subgroup.
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