Cheeger constants and $L^2$-Betti numbers

TL;DR

This paper establishes positive lower bounds on Cheeger constants and related spectral invariants for certain hyperbolic manifolds, linking geometric, spectral, and group-theoretic properties through $L^2$-Betti numbers.

Contribution

It introduces new bounds on Cheeger constants and eigenvalues for hyperbolic manifolds based on $L^2$-Betti numbers, extending previous results to higher dimensions and broader classes of groups.

Findings

Existence of positive lower bounds on Cheeger constants for manifolds of the form $X/\Gamma$.

Uniform bounds on the Hausdorff dimension of limit sets for certain Kleinian groups.

Lower bounds on the zero-th eigenvalue of the Laplacian for even-dimensional hyperbolic manifolds.

Abstract

We prove the existence of positive lower bounds on the Cheeger constants of manifolds of the form $X/\Gamma$ where $X$ is a contractible Riemannian manifold and $\Gamma<\Isom(X)$ is a discrete subgroup, typically with infinite co-volume. The existence depends on the $L^2$-Betti numbers of $\Gamma$, its subgroups and of a uniform lattice of $\Isom(X)$. As an application, we show the existence of a uniform positive lower bound on the Cheeger constant of any manifold of the form $\H^4/\Gamma$ where $\H^4$ is real hyperbolic 4-space and $\Gamma<\Isom(\H^4)$ is discrete and isomorphic to a subgroup of the fundamental group of a complete finite-volume hyperbolic 3-manifold. Via Patterson-Sullivan theory, this implies the existence of a uniform positive upper bound on the Hausdorff dimension of the conical limit set of such a $\Gamma$ when $\Gamma$ is geometrically finite. Another application shows the existence of a uniform positive lower bound on the zero-th eigenvalue of the Laplacian of $\H^n/\Gamma$ over all discrete free groups $\Gamma<\Isom(\H^n)$ whenever $n\ge 4$ is even (the bound depends on $n$). This extends results of Phillips-Sarnak and Doyle who obtained such bounds for $n\ge 3$ when $\Gamma$ is a finitely generated Schottky group.