Transposed Poisson structures on Schrodinger algebra in (n+1)-dimensional space-time
Abstract
Transposed Poisson structures on the Schr\"odinger algebra in (n+1)-dimensional space-time of Schr\"odinger Lie groups are described. It was proven that the Schr\"odinger algebra Sn in case of n≠ 2 does not have non-trivial 12-derivations and as it follows it does not admit non-trivial transposed Poisson structures. All 12-derivations and transposed Poisson structures for the algebra S2 are obtained. Also, we proved that the Schr\"odinger algebra S2 admits a non-trivial Hom-Lie structure.
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