On the tensor square of non-abelian nilpotent finite dimensional Lie algebras

Abstract

For every finite p-group G of order pn with derived subgroup of order pm, Rocco in roc proved that the order of tensor square of G is at most pn(n-m). This upper bound has been improved recently by author in ni. The aim of the present paper is to obtain a similar result for a non-abelian nilpotent Lie algebra of finite dimension. More precisely, for any given n-dimensional non-abelian nilpotent Lie algebra L with derived subalgebra of dimension m we have dim (L L)≤ (n-m)(n-1)+2. Furthermore for m=1, the explicit structure of L is given when the equality holds.