English

Harmonic 3-forms on compact homogeneous spaces

Differential Geometry 2023-02-09 v3 General Topology

Abstract

The third real de Rham cohomology of compact homogeneous spaces is studied. Given M=G/KM=G/K with GG compact semisimple, we first show that each bi-invariant symmetric bilinear form QQ on g\mathfrak{g} such that Qk×k=0Q|_{\mathfrak{k}\times\mathfrak{k}}=0 naturally defines a GG-invariant closed 33-form HQH_Q on MM, which plays the role of the so called Cartan 33-form Q([,],)Q([\cdot,\cdot],\cdot) on the compact Lie group GG. Indeed, every class in H3(G/K)H^3(G/K) has a unique representative HQH_Q. Secondly, focusing on the class of homogeneous spaces with the richest third cohomology (other than Lie groups), i.e., b3(G/K)=s1b_3(G/K)=s-1 if GG has ss simple factors, we give the conditions to be fulfilled by QQ and a given GG-invariant metric gg in order for HQH_Q to be gg-harmonic, in terms of algebraic invariants of G/KG/K. As an application, we obtain that any 33-form HQH_Q is harmonic with respect to the standard metric, although for any other normal metric, there is only one HQH_Q up to scaling which is harmonic. Furthermore, among a suitable (2s1)(2s-1)-parameter family of GG-invariant metrics, we prove that the same behavior occurs if k\mathfrak{k} is abelian: either every HQH_Q is gg-harmonic (this family of metrics depends on ss parameters) or there is a unique gg-harmonic 33-form HQH_Q (up to scaling). In the case when k\mathfrak{k} is not abelian, the special metrics for which every HQH_Q is gg-harmonic depend on 33 parameters.

Keywords

Cite

@article{arxiv.2210.07662,
  title  = {Harmonic 3-forms on compact homogeneous spaces},
  author = {Jorge Lauret and Cynthia E. Will},
  journal= {arXiv preprint arXiv:2210.07662},
  year   = {2023}
}

Comments

30 pages. Final version accepted in The Journal of Geometric Analysis

R2 v1 2026-06-28T03:38:03.904Z