Double Poisson brackets and involutive representation spaces
Abstract
Let be an algebraically closed field of characteristic 0 and A be a finitely generated associative -algebra, in general noncommutative. One assigns to A a sequence of commutative -algebras O(A,d), d=1,2,3,…, where O(A,d) is the coordinate ring of the space Rep(A,d) of d-dimensional representations of the algebra A. A double Poisson bracket on A in the sense of Van den Bergh [Trans. Amer. Math. Soc. (2008); arXiv:math/0410528] is a bilinear map \\!\!\-,-\\!\!\ from A× A to A 2, subject to certain conditions. Van den Bergh showed that any such bracket \\!\!\-,-\\!\!\ induces Poisson structures on all algebras O(A,d). We propose an analog of Van den Bergh's construction, which produces Poisson structures on the coordinate rings of certain subspaces of the representation spaces Rep(A,d). We call these subspaces the involutive representation spaces. They arise by imposing an additional symmetry condition on Rep(A,d) -- just as the classical groups from the series B, C, D are obtained from the general linear groups (series A) as fixed point sets of involutive automorphisms.
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