Efficient geodesics and an effective algorithm for distance in the complex of curves

Joan Birman; Dan Margalit; William Menasco

doi:10.1007/s00208-015-1357-y

Efficient geodesics and an effective algorithm for distance in the complex of curves

Joan Birman
, Dan Margalit
, William Menasco

Mathematics

Columbia University
Georgia Institute of Technology

Research output: Contribution to journal › Article › peer-review

10 Scopus citations

Abstract

We give an algorithm for determining the distance between two vertices of the complex of curves. While there already exist such algorithms, for example by Leasure, Shackleton, and Webb, our approach is new, simple, and more effective for all distances accessible by computer. Our method gives a new preferred finite set of geodesics between any two vertices of the complex, called efficient geodesics, which are different from the tight geodesics introduced by Masur and Minsky.

Original language	English
Pages (from-to)	1253-1279
Number of pages	27
Journal	Mathematische Annalen
Volume	366
Issue number	3-4
DOIs	https://doi.org/10.1007/s00208-015-1357-y
State	Published - Dec 1 2016

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abstract = "We give an algorithm for determining the distance between two vertices of the complex of curves. While there already exist such algorithms, for example by Leasure, Shackleton, and Webb, our approach is new, simple, and more effective for all distances accessible by computer. Our method gives a new preferred finite set of geodesics between any two vertices of the complex, called efficient geodesics, which are different from the tight geodesics introduced by Masur and Minsky.",

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N2 - We give an algorithm for determining the distance between two vertices of the complex of curves. While there already exist such algorithms, for example by Leasure, Shackleton, and Webb, our approach is new, simple, and more effective for all distances accessible by computer. Our method gives a new preferred finite set of geodesics between any two vertices of the complex, called efficient geodesics, which are different from the tight geodesics introduced by Masur and Minsky.

AB - We give an algorithm for determining the distance between two vertices of the complex of curves. While there already exist such algorithms, for example by Leasure, Shackleton, and Webb, our approach is new, simple, and more effective for all distances accessible by computer. Our method gives a new preferred finite set of geodesics between any two vertices of the complex, called efficient geodesics, which are different from the tight geodesics introduced by Masur and Minsky.

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Efficient geodesics and an effective algorithm for distance in the complex of curves

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