CLASSIFYING KNOTS AND LINKS IN L(1, -1) TEMPLATE

SENARATHNA, H B M K HIROSHANI

01 August 2023

A template is a key tool that we use to study knotted periodic orbits in the three-dimensional flow. The simplest type of template is the Lorenz template. In [5], Birman and Williams studied knotted periodic orbits with the aid of the Lorenz template. They discovered remarkable properties of Lorenz knots and links. No half twists exist in the Lorenz template. The new template is referred to be a Lorenz-like template when we add half twists. We looked at the template L(1,-1) in this paper, which has a positive half twist on the left-side and a negative half twist on the right. We look for the different types of knots and links that the template contains. Afterward, it was discovered that some knot types in L(1,-1) are fibered. Additionally, we look into the linking number of links in L(1,-1), as well as L(m; n) for m > 0 and n < 0. We have also explored the subtemplate of L(1,-1).

Braid

fibered

Knot

L(1-1) template

Lorenz template

subtemplate

A ZETA FUNCTION FOR FLOWS WITH L(−1,−1) TEMPLATE

AL-Hashimi, Ghazwan Mohammed

01 December 2016

In this dissertation, we study the flows on R3 associated with a nonlinear system differential equation introduced by Clark Robinson in [46]. The periodic orbits are modeled by a semi-flow on the L(−1,−1) template. It is known that these are positive knots, but need not have positive braid presentations. Here we prove that they are fibered. We investigate their linking and we construct a zeta-function that counts periodic orbits according to their twisting. This extends work by M. Sullivan in [55], and [57].

Alexander polynomial of knots

Fibered Knots

Positive knots and positive braids

Smale Flows

Zeta function