Transposed Poisson structures on Witt type algebras
Abstract
We describe 12-derivations, and hence transposed Poisson algebra structures, on Witt type Lie algebras V(f), where f: C is non-trivial and f(0)=0. More precisely, if |f()| 4, then all the transposed Poisson algebra structures on V(f) are mutations of the group algebra structure (V(f),·) on V(f). If |f()|=3, then we obtain the direct sum of 3 subspaces of V(f), corresponding to cosets of 0 in , with multiplications being different mutations of ·. The case |f()|=2 is more complicated, but also deals with certain mutations of ·. As a consequence, new Lie algebras that admit non-trivial Hom-Lie algebra structures are found.
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