3-decompositions of genus two handlebody-knots

TL;DR

This paper classifies essential annuli in genus two handlebody-knots, introduces new tangles and rectangles, and determines hyperbolicity for knots with up to seven crossings, advancing understanding of their structure.

Contribution

It provides a complete classification of essential annuli in 3-decomposable genus two handlebody-knots and introduces novel concepts like $ au$- and $ ho$-tangles and good rectangles.

Findings

Classified $ au$- and $ ho$-tangles with good rectangles or annuli

Determined hyperbolicity of genus two handlebody-knots up to six crossings

Identified hyperbolic handlebody-knots with seven crossings

Abstract

We investigate the class of $3$-decomposable genus two handlebody-knots and provide a complete classification of essential annuli in their exteriors. We introduce the notion of $\tau$- and $\rho$-tangles and good rectangles and annuli. By classifying $\tau$- and $\rho$-tangles whose exteriors admit a good rectangle or annulus, we categorize atoroidal $3$-decomposable genus two handlebody-knots into distinct classes, based on the number of essential annuli. As an application, the hyperbolicity of all genus two handlebody-knots with up to six crossings are determined, and numerous hyperbolic handlehody-knots with seven crossings identified. Furthermore, obstructions for a handlebody-knot to be $3$-decomposable are constructed with explicit examples provided.