English

Parallel differential forms of codegree two, and three-forms in dimension six

Differential Geometry 2026-04-28 v2

Abstract

For a differential form on a manifold, having constant components in suitable local coordinates trivially implies being parallel relative to a torsion-free connection, and the converse implication is known to be true for pp-forms in dimension nn when p=0,1,2,n1,np=0,1,2,n-1,n. We prove the converse for (n2)(n-2)-forms, and for 3-forms when n=6n=6, while pointing out that it fails to hold for Cartan 3-forms on all simple Lie groups of dimensions n8n\ge8 as well as for (n,p)=(7,3)(n,p)=(7,3) and (n,p)=(8,4)(n,p)=(8,4), where the 3-forms and 4-forms arise in compact simply connected Riemannian manifolds with exceptional holonomy groups. We also provide geometric characterizations of 3-forms in dimension six and (n2)(n-2)-forms in dimension nn having the constant-components property mentioned above, and describe examples illustrating the fact that various parts of these geometric characterizations are logically independent.

Keywords

Cite

@article{arxiv.2502.15061,
  title  = {Parallel differential forms of codegree two, and three-forms in dimension six},
  author = {Andrzej Derdzinski and Paolo Piccione and Ivo Terek},
  journal= {arXiv preprint arXiv:2502.15061},
  year   = {2026}
}

Comments

Numerous corrections of typos, style and slightly misstated arguments

R2 v1 2026-06-28T21:52:09.313Z