Generalized Ricci flow on aligned homogeneous spaces

Abstract

The fixed points of the generalized Ricci flow are the Bismut Ricci flat metrics, i.e., a generalized metric (g,H) on a manifold M, where g is a Riemannian metric and H a closed 3-form, such that H is g-harmonic and Rc(g)=14 Hg2. Given two standard Einstein homogeneous spaces Gi/K, where each Gi is a compact simple Lie group and K is a closed subgroup of them holding some extra assumption, we consider M = G1 × G2 / K. Recently, Lauret and Will proved the existence of a Bismut Ricci flat metric on any of these spaces. We proved that this metric is always asymptotically stable for the generalized Ricci flow on M among a subset of G-invariant metrics and, if G1 = G2, then it is globally stable.