Groups and Lie algebras corresponding to the Yang-Baxter equations
Abstract
For a positive integer n we introduce quadratic Lie algebras trn qtrn and discrete groups Trn, QTrn naturally associated with the classical and quantum Yang-Baxter equation, respectively. We prove that the universal enveloping algebras of the Lie algebras trn, qtrn are Koszul, and find their Hilbert series. We also compute the cohomology rings of these Lie algebras (which by Koszulity are the quadratic duals of the enveloping algebras). We construct cell complexes which are classifying spaces of the groups Trn and QTrn, and show that the boundary maps in them are zero, which allows us to compute the integral cohomology of these groups. We show that the Lie algebras trn, qtrn map onto the associated graded algebras of the Malcev Lie algebras of the groups Trn, QTrn, respectively. We conjecture that this map is actually an isomorphism (this is now a theorem due to P. Lee). At the same time, we show that the groups Trn and QTrn are not formal for n>3.
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