Transposed Poisson structures on the q-analog Virasoro-like algebras and q-Quantum Torus Lie algebras
Abstract
We investigate the transposed Poisson structures on both the q-analog Virasoro-like algebra and q-quantum torus Lie algebra considering the cases where q is generic and where q is a primitive root of unity, respectively. We establish the following results: When q is generic, there are no non-trivial 12-derivations and consequently, no non-trivial transposed Poisson algebra structures exist on the q-analog Virasoro-like algebra. Meanwhile, the q-quantum torus Lie algebra does possess non-trivial 12-derivations but lacks of a non-trivial transposed Poisson structure. When q is a primitive root of unity, both the q-analog Virasoro-like algebra and the q-quantum torus Lie algebra possess non-trivial 12-derivations. We present the non-trivial transposed Poisson algebra structure for the q-analog Virasoro-like algebra. However, the q-quantum torus Lie algebra lacks of a non-trivial transposed Poisson structure.
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