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Transposed Poisson structures on the Lie algebra of upper triangular matrices

Ivan KaygorodovUniversidade da Beira Interior, Covilhã, PortugalMykola KhrypchenkoUniversidade Federal de Santa Catarina, Florianópolis, Brazil
2024en
ABI

Abstract

We describe transposed Poisson structures on the upper triangular matrix Lie algebra T_{n}(F) , n>1 , over a field F of characteristic zero. We prove that, for n>2 , any such structure is either of Poisson type or the orthogonal sum of a fixed non-Poisson structure with a structure of Poisson type, and for n=2 , there is one more class of transposed Poisson structures on T_{n}(F) . We also show that, up to isomorphism, the full matrix Lie algebra M_{n}(F) admits only one non-trivial transposed Poisson structure, and it is of Poisson type.

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