Non-abelian extensions of infinite-dimensional Lie groups

Abstract

In this paper we study non-abelian extensions of a Lie group G modeled on a locally convex space by a Lie group N. The equivalence classes of such extension are grouped into those corresponding to a class of so-called smooth outer actions S of G on N. If S is given, we show that the corresponding set (G,N)S of extension classes is a principal homogeneous space of the locally smooth cohomology group H2ss(G,Z(N))S. To each S a locally smooth obstruction class (S) in a suitably defined cohomology group H3ss(G,Z(N))S is defined. It vanishes if and only if there is a corresponding extension of G by N. A central point is that we reduce many problems concerning extensions by non-abelian groups to questions on extensions by abelian groups, which have been dealt with in previous work. An important tool is a Lie theoretic concept of a smooth crossed module α : H G, which we view as a central extension of a normal subgroup of G.

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