Journal article
Counting essential surfaces in 3-manifolds
NM Dunfield, S Garoufalidis, J Rubinstein
Inventiones Mathematicae | Published : 2022
Abstract
We consider the natural problem of counting isotopy classes of essential surfaces in 3-manifolds, focusing on closed essential surfaces in a broad class of hyperbolic 3-manifolds. Our main result is that the count of (possibly disconnected) essential surfaces in terms of their Euler characteristic always has a short generating function and hence has quasi-polynomial behavior. This gives remarkably concise formulae for the number of such surfaces, as well as detailed asymptotics. We give algorithms that allow us to compute these generating functions and the underlying surfaces, and apply these to almost 60,000 manifolds, providing a wealth of data about them. We use this data to explore the d..
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Awarded by National Science Foundation
Funding Acknowledgements
We thank Alexander Barvinok and Josephine Yu for discussions about counting lattice points that were crucial to the proof of Theorem 1.3, as well as Craig Hodgson for helpful discussions on several related projects. We also thank the referee for their very careful reading of this paper and detailed comments. Dunfield was partially supported by U.S. National Science Foundation grant DMS-1811156, and Rubinstein partially supported by Australian Research Council grant DP160104502.