On the almost algebraicity of groups of automorphisms of connected Lie groups
Abstract
Let G be a connected Lie group, C be the maximal compact connected subgroup of the center of G, and let Aut(G) denote the group of Lie automorphisms of G, viewed, canonically, also as a subgroup of GL( G), where G is the Lie algebra of G. It is known (see Dani (1992) and Previts-Wu (2001)) that when C is trivial Aut(G) is almost algebraic, in the sense that it is open in an algebraic subgroup of GL( G), and in particular has only finitely many connected components. In this paper we analyse the situation further in this respect, with C possibly nontrivial, and identify obstructions for almost algebraicity to hold; the criteria are in terms of the group of restrictions of automorphisms of G to C, and the abelian quotient Lie group G/[G,G]C (see Theorem 1.1 for details). For the class of Lie groups which admit a finite-dimensional representation with discrete kernel (called class C groups) this yields a more precise description as to when Aut(G) is almost algebraic (see Corollary 1.3), while in the general case a variety of patterns are observed (see 6). Along the way we also study almost algebraicity of subgroups of Aut(G) fixing each point of a given torus in G, containing C (see in particular Theorem 1.5), which also turns out to be of independent interest.
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