English

Harmonic $Sp(2)$-invariant $G_2$-structures on the $7$-sphere

Differential Geometry 2022-07-29 v2

Abstract

We describe the 1010-dimensional space of Sp(2)Sp(2)-invariant G2G_2-structures on the homogeneous 77-sphere S7=Sp(2)/Sp(1)S^7=Sp(2)/Sp(1) as R+×Gl+(3,R)\mathbb{R}^+\times Gl^+(3,\mathbb{R}). In those terms, we formulate a general Ansatz for G2G_2-structures, which realises representatives in each of the 77 possible isometric classes of homogeneous G2G_2-structures. Moreover, the well-known nearly parallel round and squashed metrics occur naturally as opposite poles in an S3S^3-family, the equator of which is a new S2S^2-family of coclosed G2G_2-structures satisfying the harmonicity condition divT=0div T=0. We show general existence of harmonic representatives of G2G_2-structures in each isometric class through explicit solutions of the associated flow and describe the qualitative behaviour of the flow. We study the stability of the Dirichlet gradient flow near these critical points, showing explicit examples of degenerate and nondegenerate local maxima and minima, at various regimes of the general Ansatz. Finally, for metrics outside of the Ansatz, we identify families of harmonic G2G_2-structures, prove long-time existence of the flow and study the stability properties of some well-chosen examples.

Keywords

Cite

@article{arxiv.2103.11552,
  title  = {Harmonic $Sp(2)$-invariant $G_2$-structures on the $7$-sphere},
  author = {Eric Loubeau and Andrés J. Moreno and Henrique N. Sá Earp and Julieth Saavedra},
  journal= {arXiv preprint arXiv:2103.11552},
  year   = {2022}
}

Comments

34 pages, several modifications according to the referee's report, the major changes in: Theorem 2, Proposition 4.1 and the proofs of Lemma 1.1 and Lemma 3.4. We add a brief explanation about G-equivariant equivalent geometric structures in Section 1.2 and an Appendix with the Maple code of some standard computations on tensors

R2 v1 2026-06-24T00:24:21.704Z