Weakly Symmetric Pseudo-Riemannian Nilmanifolds

Abstract

In an earlier paper we developed the classification of weakly symmetric pseudo--riemannian manifolds G/H where G is a semisimple Lie group and H is a reductive subgroup. We derived the classification from the cases where G is compact. As a consequence we obtained the classification of semisimple weakly symmetric manifolds of Lorentz signature (n-1,1) and trans--lorentzian signature (n-2,2). Here we work out the classification of weakly symmetric pseudo--riemannian nilmanifolds G/H from the classification for the case G = N H with H compact and N nilpotent. It turns out that there is a plethora of new examples that merit further study. Starting with that riemannian case, we see just when a given involutive automorphism of H extends to an involutive automorphism of G, and we show that any two such extensions result in isometric pseudo--riemannian nilmanifolds. The results are tabulated in the last two sections of the paper.