The Strong Slope Conjecture for twisted generalized Whitehead doubles

IF 1 2区数学 Q1 MATHEMATICS

Quantum Topology Pub Date : 2018-11-28 DOI:10.4171/qt/242

K. Baker, Kimihiko Motegi, T. Takata

引用次数: 8

Abstract

The Slope Conjecture proposed by Garoufalidis asserts that the degree of the colored Jones polynomial determines a boundary slope, and its refinement, the Strong Slope Conjecture proposed by Kalfagianni and Tran asserts that the linear term in the degree determines the topology of an essential surface that satisfies the Slope Conjecture. Under certain hypotheses, we show that twisted, generalized Whitehead doubles of a knot satisfies the Slope Conjecture and the Strong Slope Conjecture if the original knot does. Additionally, we provide a proof that there are Whitehead doubles which are not adequate.

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扭曲广义Whitehead双重的强斜率猜想

Garoufalidis提出的Slope Conjecture认为有色Jones多项式的阶数决定了边界斜率，而Kalfagianni和Tran提出的Strong Slope Conjecture则认为阶数中的线性项决定了满足Slope Conjecture的本质曲面的拓扑结构。在一定的假设下，我们证明了一个结的扭曲的、广义的Whitehead双结点满足斜率猜想，如果原结满足强斜率猜想，则满足强斜率猜想。此外，我们提供了一个证据，证明存在不充分的Whitehead double。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Quantum Topology Mathematics-Geometry and Topology

CiteScore

1.80

自引率

9.10%

发文量

期刊介绍： Quantum Topology is a peer reviewed journal dedicated to publishing original research articles, short communications, and surveys in quantum topology and related areas of mathematics. Topics covered include in particular: Low-dimensional Topology Knot Theory Jones Polynomial and Khovanov Homology Topological Quantum Field Theory Quantum Groups and Hopf Algebras Mapping Class Groups and Teichmüller space Categorification Braid Groups and Braided Categories Fusion Categories Subfactors and Planar Algebras Contact and Symplectic Topology Topological Methods in Physics.