On the variety of Lagrangian subalgebras, II
Abstract
When g is a complex semisimple Lie algebra, we study the variety L of subalgebras of g g that are maximally isotropic with respect to K1 - K2, where Ki is the Killing form on the ith factor. We show the irreducible components of L are smooth, classify them in terms of the generalized Belavin-Drinfeld triples introduced by Schiffmann, and relate them to orbits of the adjoint group G× G. Building on ideas of Yakimov, we give a new proof of Karolinsky's classification of the diagonal G-orbits in L. Our proof enables us to compute of the normalizer in g of a subalgebra in L under the diagonal action. As a consequence, we recover the classification of Belavin-Drinfeld triples. By results of math.DG/9909005, L is a Poisson variety and we determine the rank of the symplectic leaf at each point of L in terms of combinatorial data and relate the symplectic leaves to intersections of orbits of subgroups of G× G. As a consequence, an intrinsically defined Poisson structure on each conjugacy class on G has an open symplectic leaf and we determine the rank at each point of the conjugacy class.
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