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Measured lamination spaces on surfaces and geometric intersection numbers

Feng Luo Richard Stong

Geometric Analysis and Geometric Topology mathscidoc:1912.43823

Topology and its Applications, 136, 205-217, 2004.1

In this paper, we produce an elementary approach to Thurston's theory of measured laminations on compact surfaces with non-empty boundary. We show that the theory can be derived from a simple inequality for geometric intersection numbers between arcs inside an octagon.

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@inproceedings{feng2004measured,
  title={Measured lamination spaces on surfaces and geometric intersection numbers},
  author={Feng Luo, and Richard Stong},
  url={http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20191224210016231085387},
  booktitle={Topology and its Applications},
  volume={136},
  pages={205-217},
  year={2004},
}

Feng Luo, and Richard Stong. Measured lamination spaces on surfaces and geometric intersection numbers. 2004. Vol. 136. In Topology and its Applications. pp.205-217. http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20191224210016231085387.

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Measured lamination spaces on surfaces and geometric intersection numbers

Feng Luo Richard Stong

Geometric Analysis and Geometric Topology mathscidoc:1912.43823

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