Homology cobordism and the geometry of hyperbolic three-manifolds

TL;DR

This paper explores the relationship between hyperbolic geometry and homology cobordism in three-dimensional manifolds, deriving bounds on solutions to Seiberg-Witten equations and analyzing subgroup structures within the homology cobordism group.

Contribution

It provides explicit bounds on spectral and Riemannian geometric invariants influencing monopole Floer homology for hyperbolic homology spheres, advancing understanding of their cobordism properties.

Findings

Derived bounds on solutions to Seiberg-Witten equations based on geometry.

Established bounds on numerical invariants in monopole Floer homology.

Analyzed subgroup structures generated by hyperbolic homology spheres.

Abstract

A major challenge in the study of the structure of the three-dimensional homology cobordism group is to understand the interaction between hyperbolic geometry and homology cobordism. In this paper, for a hyperbolic homology sphere $Y$ we derive explicit bounds on the relative grading between irreducible solutions to the Seiberg-Witten equations and the reducible one in terms of the spectral and Riemannian geometry of $Y$. Using this, we provide explicit bounds on some numerical invariants arising in monopole Floer homology (and its $\mathrm{Pin}(2)$-equivariant refinement). We apply this to study the subgroups of the homology cobordism group generated by hyperbolic homology spheres satisfying certain natural geometric constraints.