Naturally graded Lie algebras (Carnot algebras) of slow growth

Abstract

A nilpotent Lie algebra g is said to be naturally graded if it is isomorphic to its associated graded Lie algebra gr g with respect to filtration by ideals of the lower central series. This concept is equivalent to the concept of the Carnot algebra arising in sub-Riemannian geometry and the geometric control theory. We classify finite-dimensional and infinite-dimensional naturally graded Lie algebras (Carnot algebras) g=i=1+∞ gi with properties [ g1, gi]= gi+1, \; gi+ gi+1 3, \; i 1. For growth functions of such Lie algebras, we have the estimate F(n) 32n+1.