Harmonic 3-forms on compact homogeneous spaces
Abstract
The third real de Rham cohomology of compact homogeneous spaces is studied. Given with compact semisimple, we first show that each bi-invariant symmetric bilinear form on such that naturally defines a -invariant closed -form on , which plays the role of the so called Cartan -form on the compact Lie group . Indeed, every class in has a unique representative . Secondly, focusing on the class of homogeneous spaces with the richest third cohomology (other than Lie groups), i.e., if has simple factors, we give the conditions to be fulfilled by and a given -invariant metric in order for to be -harmonic, in terms of algebraic invariants of . As an application, we obtain that any -form is harmonic with respect to the standard metric, although for any other normal metric, there is only one up to scaling which is harmonic. Furthermore, among a suitable -parameter family of -invariant metrics, we prove that the same behavior occurs if is abelian: either every is -harmonic (this family of metrics depends on parameters) or there is a unique -harmonic -form (up to scaling). In the case when is not abelian, the special metrics for which every is -harmonic depend on 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