English

Relative $h$-principles for closed stable forms

Differential Geometry 2026-01-15 v2 Algebraic Topology Functional Analysis Geometric Topology

Abstract

This paper uses convex integration to develop a new, general method for proving relative hh-principles for closed, stable, exterior forms on manifolds. This method is applied to prove the relative hh-principle for 4 classes of closed stable forms which were previously not known to satisfy the hh-principle, viz.\textit{viz.} stable (2k2)(2k-2)-forms in 2k2k dimensions, stable (2k1)(2k-1)-forms in 2k+12k+1 dimensions, G~2\widetilde{\mathrm{G}}_2 3-forms and G~2\widetilde{\mathrm{G}}_2 4-forms. The method is also used to produce new, unified proofs of all three previously established hh-principles for closed, stable forms, viz.\textit{viz.} the hh-principles for closed stable 2-forms in 2k+12k+1 dimensions, closed G2\mathrm{G}_2 4-forms and closed SL(3;C)\mathrm{SL}(3;\mathbb{C}) 3-forms. In addition, it is shown that if a class of closed stable forms satisfies the relative hh-principle, then the corresponding Hitchin functional (whenever defined) is necessarily unbounded above. Due to the general nature of the hh-principles considered in this paper, the application of convex integration requires an analogue of Hodge decomposition on arbitrary nn-manifolds (possibly non-compact, or with boundary) which cannot, to the author's knowledge, be found elsewhere in the literature. Such a decomposition is proven in Appendix A.

Keywords

Cite

@article{arxiv.2309.08721,
  title  = {Relative $h$-principles for closed stable forms},
  author = {Laurence H. Mayther},
  journal= {arXiv preprint arXiv:2309.08721},
  year   = {2026}
}

Comments

43 pages; some minor typos corrected and contact details updated

R2 v1 2026-06-28T12:23:05.510Z