What question did this study set out to answer?

The study aims to explore the extension of GKM graphs from GKM_4 manifolds to torus graphs based on specific mathematical frameworks.

May 17, 2026Open Access

Extensions of realizable Hamiltonian and complexity one GKM₄ graphs

Puntos clave

The study aims to explore the extension of GKM graphs from GKM_4 manifolds to torus graphs based on specific mathematical frameworks.
Reformulated the extension problem using the fundamental group's representation of GKM graphs.
Utilized a coordinate-free version of Kuroki's axial function group.
Analyzed covers of GKM graphs and acyclicity properties of their orbit spaces.
Established that GKM graphs of complexity one can extend to torus graphs.
Demonstrated fundamental group representations that facilitate these extensions.
Provided acyclicity results crucial for understanding the structure of GKM manifolds.

Resumen

Abstract We prove that the GKM graphs of GKM₄ GKM 4 manifolds that are either Hamiltonian or of complexity one extend to torus graphs. The arguments are based on a reformulation of the extension problem in terms of a natural representation of the fundamental group of the GKM graph, using a coordinate-free version of the axial function group of Kuroki, as well as on covers of GKM graphs and acyclicity results for orbit spaces of GKM manifolds.

Me gusta

Guardar

Ver artículo completo