MICC: A tool for computing short distances in the curve complex

TL;DR

MICC is a software tool implementing an algorithm to compute distances in the curve complex of surfaces, providing new examples of vertices at distance four in genus 2 and 3, advancing computational methods in geometric topology.

Contribution

The paper introduces MICC, a software package that implements the initially efficient geodesic algorithm for the curve complex, enabling new computations and examples in surface topology.

Findings

Successfully computed new examples of distance four vertices for genus 2 and 3.

Demonstrated the effectiveness of MICC in complex distance calculations.

Extended known examples of vertices at specific distances in the curve complex.

Abstract

The complex of curves $\mathcal{C}(S_g)$ of a closed orientable surface of genus $g \geq 2$ is the simplicial complex having its vertices, $\mathcal{C}^0(S_g)$, are isotopy classes of essential curves in $S_g$. Two vertices co-bound an edge of the $1$-skeleton, $\mathcal{C}^1(S_g)$, if there are disjoint representatives in $S_g$. A metric is obtained on $\mathcal{C}^0(S_g)$ by assigning unit length to each edge of $\mathcal{C}^1(S_g)$. Thus, the distance between two vertices, $d(v,w)$, corresponds to the length of a geodesic---a shortest edge-path between $v$ and $w$ in $\mathcal{C}^1 (S_g)$. Recently, Birman, Margalit and the second author introduced the concept of {\em initially efficient geodesics} in $\mathcal{C}^1(S_g)$ and used them to give a new algorithm for computing the distance between vertices. In this note we introduce the software package MICC ({\em Metric in the Curve Complex}), a partial implementation of the initially efficient geodesic algorithm. We discuss the mathematics underlying MICC and give applications. In particular, we give examples of distance four vertex pairs, for $g=2$ and 3. Previously, there was only one known example, in genus $2$, due to John Hempel.