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Main Authors: Elzenaar, Alex, Martin, Gaven, Schillewaert, Jeroen
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2204.08076
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author Elzenaar, Alex
Martin, Gaven
Schillewaert, Jeroen
author_facet Elzenaar, Alex
Martin, Gaven
Schillewaert, Jeroen
contents We introduce a family of 3-variable "Farey polynomials" that are closely connected with the geometry and topology of $3$-manifolds and orbifolds as they can be used to produce concrete realisations of the boundaries and local coordinates for one-complex-dimensional deformation spaces of Kleinian groups. As such, this family of polynomials has a number of quite remarkable properties. We study these polynomials from an abstract combinatorial viewpoint, including a recursive definition extending that which is known in the literature for the special case of manifolds, even beyond what the geometry predicts. We also present some intriguing examples and conjectures which we would like to bring to the attention of researchers interested in algebraic combinatorics and hypergeometric functions. The results in this paper additionally provide a practical approach to various classification problems for rank-two subgroups of PSL(2,C) since they, together with other recent work of the authors, make it possible to provide certificates that certain groups are discrete and free, and effective ways to identify relators.
format Preprint
id arxiv_https___arxiv_org_abs_2204_08076
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle The combinatorics of Farey words and their traces
Elzenaar, Alex
Martin, Gaven
Schillewaert, Jeroen
Geometric Topology
Combinatorics
11B37, 11B39, 11B57, 20F36, 57K20 (Primary), 32G15, 30F40, 33C45, 41A10 (Secondary)
We introduce a family of 3-variable "Farey polynomials" that are closely connected with the geometry and topology of $3$-manifolds and orbifolds as they can be used to produce concrete realisations of the boundaries and local coordinates for one-complex-dimensional deformation spaces of Kleinian groups. As such, this family of polynomials has a number of quite remarkable properties. We study these polynomials from an abstract combinatorial viewpoint, including a recursive definition extending that which is known in the literature for the special case of manifolds, even beyond what the geometry predicts. We also present some intriguing examples and conjectures which we would like to bring to the attention of researchers interested in algebraic combinatorics and hypergeometric functions. The results in this paper additionally provide a practical approach to various classification problems for rank-two subgroups of PSL(2,C) since they, together with other recent work of the authors, make it possible to provide certificates that certain groups are discrete and free, and effective ways to identify relators.
title The combinatorics of Farey words and their traces
topic Geometric Topology
Combinatorics
11B37, 11B39, 11B57, 20F36, 57K20 (Primary), 32G15, 30F40, 33C45, 41A10 (Secondary)
url https://arxiv.org/abs/2204.08076