Gauge theory and G2-geometry on Calabi-Yau links

TL;DR

This paper explores the geometry of 7-dimensional links of hypersurfaces, introducing a G2-structure, classifying it with an invariant, and developing a Yang-Mills theory that connects to known theories like Donaldson-Thomas.

Contribution

It constructs a canonical G2-structure on Calabi-Yau links, introduces a new invariant for classification, and develops a Yang-Mills theory with topological and geometric insights.

Findings

Defined a G2-structure on Calabi-Yau links

Introduced the Crowley-Nordström $ u$ invariant and proved its properties

Connected G2-instantons to Hermitian Yang-Mills connections and Donaldson-Thomas theory

Abstract

The $7$-dimensional link $K$ of a weighted homogeneous hypersurface on the round $9$-sphere in $\mathbb{C}^5$ has a nontrivial null Sasakian structure which is contact Calabi-Yau, in many cases. It admits a canonical co-closed $\rm G_2$-structure $\varphi$ induced by the Calabi-Yau $3$-orbifold basic geometry. We distinguish these pairs $(K,\varphi)$ by the Crowley-Nordstr\"om $\mathbb{Z}_{48}$-valued $\nu$ invariant, for which we prove odd parity and provide an algorithmic formula. We describe moreover a natural Yang-Mills theory on such spaces, with many important features of the torsion-free case, such as a Chern-Simons formalism and topological energy bounds. In fact compatible $\rm G_2$-instantons on holomorphic Sasakian bundles over $K$ are exactly the transversely Hermitian Yang-Mills connections. As a proof of principle, we obtain $\rm G_2$-instantons over the Fermat quintic link from stable bundles over the smooth projective Fermat quintic, thus relating in a concrete example the Donaldson-Thomas theory of the quintic threefold with a conjectural $\rm G_2$-instanton count.