Generalized cluster structures related to Poisson duals of SLn

Abstract

We study Poisson varieties (SLn,π) parameterized by Belavin--Drinfeld quadruples :=(,r0) of type An-1 along with generalized cluster structures GC() in C[SLn] compatible with π. The Poisson structure π is a pushforward of the Poisson structure π* of the Poisson dual SLn* of (SLn,π). We prove that the generalized upper cluster algebra of GC() is naturally isomorphic to C[SLn]. Moreover, for any connected reductive complex group G and a BD quadruple (,r0), we produce a Poisson birational map Q:(G,π(std,r0))(G,π(,r0)), and when G ∈ \SLn,GLn\, we show that Q is a birational quasi-isomorphism between GC(std) and GC(). Lastly, for any pair of BD triples of type An-1 comparable in the natural order, we use the map Q to construct a birational quasi-isomorphism between GC() and GC().

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