Random methods in 3-manifold theory

Alexander Lubotzky; Joseph Maher; Conan Wu

doi:10.1134/S0081543816010089

Random methods in 3-manifold theory

作者: Lubotzky A.¹, Maher J.², Wu C.³
隶属关系:
1. Einstein Institute of Mathematics
2. College of Staten Island and Graduate Center
3. Mathematics Department
期: 卷 292, 编号 1 (2016)
页面: 118-142
栏目: Article
URL: https://journals.rcsi.science/0081-5438/article/view/173446
DOI: https://doi.org/10.1134/S0081543816010089
ID: 173446

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详细

The surface map arising from a random walk on the mapping class group may be used as the gluing map for a Heegaard splitting, and the resulting 3-manifold is known as a random Heegaard splitting. We show that the splitting distance of random Heegaard splittings grows linearly in the length of the random walk, with an exponential decay estimate for the proportion with slower growth. We use this to obtain the limiting distribution of Casson invariants of random Heegaard splittings.