Double Transposed Poisson Algebras
Abstract
We introduce double transposed Poisson algebras, a noncommutative analogue of the transposed Poisson algebras of Bai, Bai, Guo and Wu that is compatible with the Kontsevich--Rosenberg principle. We first consider a simplified version which we call id-adapted double transposed Poisson algebras and then explore the general definition. We prove that every such structure on a unital associative algebra A is governed by a single derivation AS(A/[A,A]). Furthermore, this induces a GLN-equivariant transposed Poisson structure on each representation algebra AN=[RepN(A)]. We also define H0-transposed Poisson structures, the transposed counterpart of Crawley-Boevey's H0-Poisson structures, and use the trace map to obtain a transposed Poisson structure on the ring of GLN-invariants ANGLN.
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