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Related papers: High distance knots

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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…

Geometric Topology · Mathematics 2010-09-14 Hiroshi Goda , Chuichiro Hayashi

We consider the space of all smooth knots in the 3-sphere isotopic to a given knot, with the aim of finding a small subspace onto which this large space deformation retracts. For torus knots and many hyperbolic knots we show the subspace…

Geometric Topology · Mathematics 2007-05-23 Allen Hatcher

We produce embeddings of knots in thin position that admit compressible thin levels. We also find the bridge number of tangle sums where each tangle is high distance.

Geometric Topology · Mathematics 2016-01-20 Ryan Blair , Alexander Zupan

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…

Geometric Topology · Mathematics 2016-08-16 Enrique Ramírez-Losada , Luis G. Valdez-Sánchez

Let K be a knot in a closed orientable irreducible 3-manifold M and let P be a Heegaard splitting of the knot complement of genus at least two. Suppose Q is a bridge surface for K. Then either \begin{itemize} \item $d(P)\leq 2-\chi(Q-K)$,…

Geometric Topology · Mathematics 2007-05-23 Maggy Tomova

A knot in S^3 is said to have crosscap number two if it bounds a once-punctured Klein bottle but not a Moebius band. In this paper we give a method of constructing crosscap number two hyperbolic (1,2)-knots with tunnel number one which are…

Geometric Topology · Mathematics 2008-12-17 Luis G. Valdez-Sanchez , Enrique Ramirez-Losada

If a 3--manifold $Y$ contains a non-separating sphere, then some twisted Heegaard Floer homology of $Y$ is zero. This simple fact allows us to prove several results about Dehn surgery on knots in such manifolds. Similar results have been…

Geometric Topology · Mathematics 2014-10-01 Yi Ni

J. Hempel's definition of the distance of a Heegaard surface generalizes to a complexity for a knot which is in bridge position with respect to a Heegaard surface. Our main result is that the distance of a knot in bridge position is bounded…

Geometric Topology · Mathematics 2007-05-23 David Bachman , Saul Schleimer

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…

Geometric Topology · Mathematics 2011-08-18 Sangbum Cho , Darryl McCullough

Let $h(K)$, $g_H(K)$, $g_1(K)$, $t(K)$ be the $h$-genus, Heegaard genus, bridge-1 genus, tunnel number of a knot $K$ in the $3$-sphere $S^3$, respectively. It is known that $g_H(K)-1=t(K)\leq g_1(K)\leq h(K)\leq g_H(K)$. A natural question…

Geometric Topology · Mathematics 2025-04-29 Ruifeng Qiu , Chao Wang , Yanqing Zou

Given a knot in the three-sphere, is it possible to unknot it by performing a single twist, and if so, what are the possible linking numbers of such a twist? We develop obstructions to unknotting using a twist of a specified linking number.…

Geometric Topology · Mathematics 2021-07-20 Samantha Allen , Charles Livingston

We show that, for any integers, $g \geq 3$ and $n \geq 2$, there exists a link in $S^3$ such that its complement has a genus $g$ Heegaard splitting with distance $n$.

Geometric Topology · Mathematics 2021-01-19 Xifeng Jin

In 2001, J. Hempel proved the existence of Heegaard splittings of arbitrarily high distance by using a high power of a pseudo-Anosov map as the gluing map between two handlebodies. We show that lower bounds on distance can also be obtained…

Geometric Topology · Mathematics 2014-10-01 Michael Yoshizawa

Let S be a finite union of (pairwise disjoint but possibly knotted and linked) closed curves and tubes in the round sphere S^3 or in the flat torus T^3. In the case of the torus, S is further assumed to be contained in a contractible subset…

Analysis of PDEs · Mathematics 2015-05-26 Alberto Enciso , Daniel Peralta-Salas , Francisco Torres de Lizaur

It is proven here that if the connected sum of two tunnel number one knots in the 3-sphere is a tunnel number two knot, then at least one of the summand knots has a genus two Heegaard splitting with a meridian as a primitive element. Hence…

Geometric Topology · Mathematics 2009-09-25 Yoav Moriah

We show that there exist knots K in S^3 with g(E(K))=2 and g(E(K#K#K))=6. Together with Theorem~1.5 of [1], this proves existence of counterexamples to Morimoto's Conjecture (Conjecture 1.5 of [2]). This is a special case of…

Geometric Topology · Mathematics 2007-05-23 Tsuyoshi Kobayashi , Yo'av Rieck

We show that there exist infinitely many pairs of distinct knots in the 3-sphere such that each pair can yield homeomorphic lens spaces by the same Dehn surgery. Moreover, each knot of the pair can be chosen to be a torus knot, a satellite…

Geometric Topology · Mathematics 2008-09-02 Toshio Saito , Masakazu Teragaito

In this paper, we define the rectangle condition on the bridge sphere for a $n$-bridge decomposition of a knot whose definition is analogous to the definition of the rectangle condition for Heegaard splittings of $3$-manifolds. We show that…

Geometric Topology · Mathematics 2017-05-09 Bo-hyun Kwon

In a recent paper, the first author and his collaborator developed a method to compute an upper bound of the dimension of instanton Floer homology via Heegaard Diagrams of 3-manifolds. For a knot inside S3, we further develop an algorithm…

Geometric Topology · Mathematics 2023-02-24 Zhenkun Li , Yi Liang

We show there exists a linear function w: N->N with the following property. Let K be a hyperbolic knot in a hyperbolic 3-manifold M admitting a non-longitudinal S^3 surgery. If K is put into thin position with respect to a strongly…

Geometric Topology · Mathematics 2013-11-20 Kenneth L. Baker , Cameron Gordon , John Luecke