Statistical Lie algebras of a constant curvature and locally conformally K\"ahler Lie algebras
Abstract
We show that a statistical manifold manifold of a constant non-zero curvature can be realised as a level line of Hessian potential on a Hessian cone. We construct a Sasakian structure on TM× by a statistical manifold manifold of a constant non-zero curvature on M. By a statistical Lie algebra of a constant non-zero Lie algebra we construct a l.c.K Lie algebra.
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