Constructing Multicusped Hyperbolic Manifolds That are Isospectral and Not Isometric

Authors

Benjamin Linowitz, Oberlin College

Abstract

In a recent paper Garoufalidis and Reid constructed pairs of 1-cusped hyperbolic 3-manifolds which are isospectral but not isometric. We extend this work to the multicusped setting by constructing isospectral but not isometric hyperbolic 3-manifolds with arbitrarily many cusps. The manifolds we construct have the same Eisenstein series, the same infinite discrete spectrum and the same complex length spectrum. Our construction makes crucial use of Sunada's method and the strong approximation theorem of Nori and Weisfeiler.

Repository Citation

Linowitz, Benjamin. 2024. "Constructing Multicusped Hyperbolic Manifolds That are Isospectral and Not Isometric." Rocky Mountain Journal of Mathematics 54(3): 809-821.

Publisher

Rocky Mountain Mathematics Consortium, Arizona State University

Publication Date

6-1-2024

Publication Title

Rocky Mountain Journal of Mathematics

Department

Mathematics

Document Type

Article

DOI

https://doi.org/10.1216/rmj.2024.54.809

Keywords

Hyperbolic manifolds, Isospectrality, Eigenvalues, Subgroups, Operator, Formula, Matrix, Number

Language

English

Format

text