Classification des triples de Manin pour les alg\`ebres de Lie r\'eductives complexes

Abstract

We study real and complex Manin triples for a complex reductive Lie algebra, . The first part includes, and extends to complex Manin triples, our earlier work [De]. First, we generalize results of E. Karolinsky, on the classification of Lagrangian subalgebras (cf.[K1], [K3]). Then we show that, if is non commutative, one can attach, to each Manin triple in , another one for a strictly smaller reductive complex Lie subalgebra of . This gives a powerful tool for induction. Then we classify complex Manin triples, in terms of what we call generalized Belavin-Drinfeld data. In particular this generalizes, by other methods, the classification of A. Belavin and G. Drinfeld of certain R-matrices, i.e. the solutions of modified triangle equations for constants (cf [BD], Theorem 6.1). We get also results for real Manin triples. In passing, one retrieves a result of A. Panov [P1] which classifies certain Lie bialgebras structures on a real simple Lie algebra.

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