Abstract:
This article examines how some characteristics of Lie algebra variety like co-length are connected with the variety structure in the case of zero-characteristic field. In particular, it is proved that co-length finiteness for the variety $V$ implies the inclusion $U_2\not\subset V\subset N_sA$, where $s$ is some natural number, and, as a consequence, the polynomial growth of the variety $V$.
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