Naturally reductive pseudo-Riemannian Lie groups in low dimensions

Abstract

This work concerns the non-flat metrics on the Heisenberg Lie group of dimension three 3() and the bi-invariant metrics on the solvable Lie groups of dimension four. On 3() we prove that the property of the metric being naturally reductive is equivalent to the property of the center being non-degenerate. These metrics are Lorentzian algebraic Ricci solitons. We start with the indecomposable Lie groups of dimension four admitting bi-invariant metrics and which act on 3() by isometries and we finally study some geometrical features on these spaces.