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相关论文: Parameterizations of 1-bridge torus knots

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A knot K in a closed connected orientable 3-manifold M is called a 1-genus 1-bridge knot if (M,K) has a splitting into two pairs of a solid torus V_i (i=1,2) and a boundary parallel arc in it. The splitting induces a genus two Heegaard…

几何拓扑 · 数学 2010-09-14 Hiroshi Goda , Chuichiro Hayashi

A knot K is called a 1-genus 1-bridge knot in a 3-manifold M if (M,K) has a Heegaard splitting (V_1,t_1)\cup (V_2,t_2) where V_i is a solid torus and t_i is a boundary parallel arc properly embedded in V_i. If the exterior of a knot has a…

几何拓扑 · 数学 2010-09-14 Hiroshi Goda , Chuichiro Hayashi

A (1,1) knot K in a 3-manifold M is a knot that intersects each solid torus of a genus 1 Heegaard splitting of M in a single trivial arc. Choi and Ko developed a parameterization of this family of knots by a four-tuple of integers, which…

几何拓扑 · 数学 2011-10-27 Philip Ording

A knot in the 3-sphere in genus-1 1-bridge position (called a (1,1)-position) can be described by an element of the braid group of two points in the torus. Our main results tell how to translate between a braid group element and the…

几何拓扑 · 数学 2011-08-05 Sangbum Cho , Darryl McCullough

We present two different representations of (1,1)-knots and study some connections between them. The first representation is algebraic: every (1,1)-knot is represented by an element of the pure mapping class group of the twice punctured…

几何拓扑 · 数学 2007-05-23 Alessia Cattabriga , Michele Mulazzani

For a genus-1 1-bridge knot in the 3-sphere, that is, a (1,1)-knot, a middle tunnel is a tunnel that is not an upper or lower tunnel for some (1,1)-position. Most torus knots have a middle tunnel, and non-torus-knot examples were obtained…

几何拓扑 · 数学 2011-10-18 Sangbum Cho , Darryl McCullough

We describe the genus two knots which admit a genus one, one bridge position. These are divided into several families, one consists of vertical bandings of two genus one $(1,1)$-knots, other consists of vertical bandings of two cross cap…

We develop an algebraic representation for (1,1)-knots using the mapping class group of the twice punctured torus MCG(T,2). We prove that every (1,1)-knot in a lens space L(p,q) can be represented by the composition of an element of a…

几何拓扑 · 数学 2007-05-23 Alessia Cattabriga , Michele Mulazzani

In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cyclic coverings of lens spaces (eventually $\bf S^3$), branched over genus one 1-bridge knots. As a consequence, we give a positive answer to the…

几何拓扑 · 数学 2007-05-23 Luigi Grasselli , Michele Mulazzani

We compute the genus zero bridge numbers and give lower bounds on the genus one bridge numbers for a large class of sufficiently generic hyperbolic twisted torus knots. As a result, the bridge spectra of these knots have two gaps which can…

几何拓扑 · 数学 2014-03-27 R. Sean Bowman , Scott Taylor , Alex Zupan

An $n$-plat 1-knot is one isotopic to the plat closure of some $2n$-braid, which is also called an $n$-bridge 1-knot. Schubert classified 2-bridge 1-knots by considering their double branched covers which are homeomorphic to lens spaces. A…

几何拓扑 · 数学 2026-05-05 Jumpei Yasuda

Let $T$ be a satellite knot, link, or spatial graph in a 3-manifold $M$ that is either $S^3$ or a lens space. Let $\mathfrak{b}_0$ and $\mathfrak{b}_1$ denote genus 0 and genus 1 bridge number, respectively. Suppose that $T$ has a companion…

几何拓扑 · 数学 2025-07-18 Scott A. Taylor , Maggy Tomova

We determine the pairs of torus knots that have a genus one cobordism between them, with one notable exception. This is done by combining obstructions using $\nu^+$ from the Heegaard Floer knot complex and explicit constructions of…

几何拓扑 · 数学 2020-06-25 Peter Feller , JungHwan Park

M. Scharlemann has recently proved that any genus one tunnel number one knot is either a satellite or 2-bridge knot, as conjectured by H. Goda and M. Teragaito; all such knots admit a (1,1) decomposition. In this paper we give a…

几何拓扑 · 数学 2016-08-16 Enrique Ramírez-Losada , Luis G. Valdez-Sánchez

A $(1,1)$-knot in the 3-sphere is a knot that admits a 1-bridge presentation with respect to a Heegaard torus in $\mathbb{S}^{3}$. A new parameterization of $(1,1)$-knots distinct from the classical ones is introduced. This parameterization…

几何拓扑 · 数学 2021-08-11 José Frías

We show that a torus knot which is not 2-bridge has a unique irreducible bridge splitting of positive genus.

几何拓扑 · 数学 2015-05-27 Alexander Zupan

In this work, we find a closed form formula for the braid index of an $n$-bridge braid, a class of positive braid knots which simultaneously generalizes torus knots, 1-bridge braids, and twisted torus knots. Our proof is elementary,…

几何拓扑 · 数学 2023-09-12 Dane Gollero , Siddhi Krishna , Marissa Loving , Viridiana Neri , Izah Tahir , Len White

If a knot K in a closed, orientable 3-manifold M has a bridge surface T with distance at least 3 in the curve complex of T - K, then the genus of any essential surface in its exterior with non-empty, non-meridional boundary gives rise to an…

几何拓扑 · 数学 2012-11-21 Ryan Blair , Marion Campisi , Jesse Johnson , Scott A. Taylor , Maggy Tomova

The structure of the first homology group of a cyclic covering of a knot is an important invariant well known in the knot theory. In the last century, H. Seifert developed a general approach to compute the homology group of the covering.…

组合数学 · 数学 2021-11-09 Ilya Mednykh

Every torus knot can be represented as a Fourier-(1,1,2) knot which is the simplest possible Fourier representation for such a knot. This answers a question of Kauffman and confirms the conjecture made by Boocher, Daigle, Hoste and Zheng.…

几何拓扑 · 数学 2007-08-28 Jim Hoste
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