The moment map for the variety of Leibniz algebras

Abstract

We consider the moment map m:PVn→ iu(n) for the action of GL(n) on Vn=2(Cn)*n, and study the functional Fn=\|m\|2 restricted to the projectivizations of the algebraic varieties of all n-dimensional Leibniz algebras Ln and all n-dimensional symmetric Leibniz algebras Sn, respectively. Firstly, we give a description of the maxima and minima of the functional Fn: Ln → R, proving that they are actually attained at the symmetric Leibniz algebras. Then, for an arbitrary critical point [μ] of Fn: Sn → R, we characterize the structure of [μ] by virtue of the nonnegative rationality. Finally, we classify the critical points of Fn: Sn → R for n=2, 3, respectively.