2019
DOI: 10.1007/978-3-030-16031-9_1
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A Survey of Hyperbolic Knot Theory

Abstract: We survey some tools and techniques for determining geometric properties of a link complement from a link diagram. In particular, we survey the tools used to estimate geometric invariants in terms of basic diagrammatic link invariants. We focus on determining when a link is hyperbolic, estimating its volume, and bounding its cusp shape and cusp area. We give sample applications and state some open questions and conjectures.2010 Mathematics Subject Classification. 57M25, 57M27, 57M50.

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Cited by 4 publications
(5 citation statements)
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References 76 publications
(63 reference statements)
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“…the interior of the 3manifold C(K 9 46 ) admits a hyperbolic metric. In general, every link L is hyperbolic if the interior of its complement C(L) is a hyperbolic 3-manifold (with negative sectional curvature), see [21] for a recent survey. There is a deep result of Menasco [22], that every link having a knot diagram with alternating crossings along each components is a hyperbolic link if it is nonsplit (every component is linked) and prime (it cannot be decomposed into sums) unless it is a torus link.…”
Section: Geometric Properties Of the Embeddingmentioning
confidence: 99%
“…the interior of the 3manifold C(K 9 46 ) admits a hyperbolic metric. In general, every link L is hyperbolic if the interior of its complement C(L) is a hyperbolic 3-manifold (with negative sectional curvature), see [21] for a recent survey. There is a deep result of Menasco [22], that every link having a knot diagram with alternating crossings along each components is a hyperbolic link if it is nonsplit (every component is linked) and prime (it cannot be decomposed into sums) unless it is a torus link.…”
Section: Geometric Properties Of the Embeddingmentioning
confidence: 99%
“…These two topological polyhedra do not necessarily agree with the complete hyperbolic structure. That is, there may not exist two ideal hyperbolic polyhedra having the same combinatorial type as checkerboard polyhedra and they can be glued as checkerboard polyhedra to give the complete hyperbolic structure of S 3 − L. We define horoball neighborhood of a link following [13].…”
Section: Definitionsmentioning
confidence: 99%
“…To state our results we need some terminology that we will not define in detail. For definitions and more details the reader is referred to [15]. Over the years there has been a number of results about coarse relations between diagrammatic link invariants and the volume of hyperbolic links.…”
Section: Bounds For Seifert Manifoldsmentioning
confidence: 99%
“…Over the years there has been a number of results about coarse relations between diagrammatic link invariants and the volume of hyperbolic links. See [15] and references therein. Using such results, for restricted classes of 3-manifolds, we obtain sharper bounds than the one of Theorem 1.1.…”
Section: Bounds For Seifert Manifoldsmentioning
confidence: 99%
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