New Techniques for Computing Geometric Index
Abstract
We introduce \textcolor{red}{general} new techniques for computing the geometric index of a link in the interior of a solid torus . These techniques simplify and unify previous ad hoc methods used to compute the geometric index in specific examples \textcolor{red}{ and allow the simple computation of geometric index for new examples where the index was not previously known}. The geometric index measures the minimum number of times any meridional disc of must intersect . It is related to the algebraic index in the sense that adding up signed intersections of an interior simple closed curve in with a meridional disc gives the algebraic index of in . One key idea is introducing the notion of geometric index for solid chambers of the form in . After that we prove that if a solid torus can be divided into solid chambers by meridional discs in a specific \textcolor{red}{(and often easy to obtain)} way, then the geometric index can be easily computed.
Keywords
Cite
@article{arxiv.1711.04267,
title = {New Techniques for Computing Geometric Index},
author = {Kathryn B. Andrist and Dennis J. Garity and Dušan D. Repovš and David G. Wright},
journal= {arXiv preprint arXiv:1711.04267},
year = {2017}
}