Solvable extensions of negative Ricci curvature of filiform Lie groups

Abstract

We give necessary and sufficient conditions of the existence of a left-invariant metric of strictly negative Ricci curvature on a solvable Lie group the nilradical of whose Lie algebra g is a filiform Lie algebra n. It turns out that such a metric always exists, except for in the two cases, when n is one of the algebras of rank two, Ln or Qn, and g is a one-dimensional extension of n, in which cases the conditions are given in terms of certain linear inequalities for the eigenvalues of the extension derivation.