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This work explores nearly parallel G2-structures that exhibit torus symmetry and their geometric properties. The aim is to understand how these structures can be constructed and characterized.

June 8, 2026Open Access

Nearly parallel G₂-structures with torus symmetry

Key Points

This work explores nearly parallel G2-structures that exhibit torus symmetry and their geometric properties. The aim is to understand how these structures can be constructed and characterized.
Utilized multi-moment map techniques to study G2-structures with a three-torus symmetry.
Analyzed the geometry of base spaces through closed two-forms and Riemannian metrics.
Developed an inverse construction for generating invariant nearly parallel G2-structures from three-dimensional inputs.
Identified that the base spaces are defined by two triples of closed two-forms influenced by a Riemannian metric.
Showed that the torus acts freely on regular level sets, leading to torus bundles over smooth three-dimensional manifolds.
Demonstrated local examples of nearly parallel G2-structures with symmetries extending to four-toruses.

Abstract

Abstract We study nearly parallel G₂ G 2 -structures with a three-torus symmetry via multi-moment map techniques. An effective three-torus action on a nearly parallel G₂ G 2 -manifold yields a multi-moment map. The torus acts freely on its regular level sets, so they are torus bundles over smooth three-dimensional manifolds. We show that the geometry of the base spaces is specified by two triples of closed two-forms related by a Riemannian metric. We then describe an inverse construction producing invariant nearly parallel G₂ G 2 -structures from three-dimensional data. We observe that locally this may produce examples with four-torus symmetry.

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