Automorphisms of finite order, periodic contractions, and Poisson-commutative subalgebras of S( g)
Abstract
Let g be a semisimple Lie algebra, ∈ Aut( g) a finite order automorphism, and g0 the subalgebra of fixed points of . Recently, we noticed that using one can construct a pencil of compatible Poisson brackets on S( g), and thereby a `large' Poisson-commutative subalgebra Z( g,) of S( g) g0. In this article, we study invariant-theoretic properties of ( g,) that ensure good properties of Z( g,). Associated with one has a natural Lie algebra contraction g(0) of g and the notion of a good generating system (=g.g.s.) in S( g) g. We prove that in many cases the equality ind\, g(0)=ind\, g holds and S( g) g has a g.g.s. According to V.G. Kac's classification of finite order automorphisms (1969), can be represented by a Kac diagram, K(), and our results often use this presentation. The most surprising observation is that g(0) depends only on the set of nodes in K() with nonzero labels, and that if is inner and a certain label is nonzero, then g(0) is isomorphic to a parabolic contraction of g.
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