Symplectic Novikov Lie Algebra
Abstract
It is well known that a symplectic Lie algebra admit a left symmetric product. In this work, we study the case where this product is Novikov, we show that the left-symmetric product associated to the symplectic Lie algrbra is Novikov if and only if it is associative. In this case the symplectic Lie algebra is called symplectic Novikov Lie algebra(SNLA). We show that any SNLA is completely reducible two-step solvable. The classification of 4-dimensional and nilpotent 6-dimensional, also some methods for building large classes of examples are presented. Finally, we give a geometric study of the affine connection associated with an SNLA.
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