Danny Calegari, Hongbin Sun, Shicheng Wang
Published 2010-03-01, updated 2010-06-28Version 2
This paper initiates a systematic study of the relation of commensurability of surface automorphisms, or equivalently, fibered commensurability of 3-manifolds fibering over the circle. We show that every hyperbolic fibered commensurability class contains a unique minimal element, whereas the class of Seifert manifolds fibering over the circle consists of a single commensurability class with infinitely many minimal elements. The situation for non-geometric manifolds is more complicated, and we illustrate a range of phenomena that can occur in this context.
Comments: 26 pages, 16 figures; version 2 incorporates referee's comments
Journal: Pacific J. Math. 250 (2011), no. 2, 287-317
On commensurability of fibrations on a hyperbolic 3-manifold
Fibered commensurability on $\mathrm{Out}(F_{n})$
Circular orderability of 3-manifold groups
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