References

[Ag11]

I. Agol, “Ideal triangulations of pseudo-Anosov mapping tori” Li, Weiping (ed.) et al., Topology and geometry in dimension three. Triangulations, invariants, and geometric structures. Conference in honor of William Jaco’s 70th birthday. American Mathematical Society (AMS). Contemporary Mathematics 560, 1-17 (2011).

[CaFeZa11]

J. Cassaigne, S. Ferenczi, L. Zamboni “Combinatorial trees arising in the study of interval exchange transformations” Eur. J. Comb. 32, No. 8, 1428-1444 (2011).

[FeZa10]

S. Ferenczi, L. Zamboni “Structure of K-interval exchange transformations: induction, trajectories, and distance theorems” J. Anal. Math. 112, 289-328 (2010).

[DeUl15]

V. Delecroix, C. Ulcigrai “Diagonal changes for surfaces in hyperelliptic components” Geom. Dedicata 176, 117-174 (2015).

[Gu09]

F. Guéritaud “Triangulated cores of punctured-torus groups” J. Differ. Geom. 81, No. 1, 91-142 (2009).

[Gu16]

F. Guéritaud “Veering triangulations and Cannon-Thurston maps” J. of Topology 9, No. 3, 957-983 (2016).

[Ha09]

U. Hamenstädt, “Geometry of the mapping class groups. I: Boundary amenability” Invent. Math. 175, No. 3, 545-609 (2009).

[BeDeGaGuSc]

M. Bell, V. Delecroix, V. Gadre, R. Gutiérrez-Romo, S. Schleimer “Coding Teichmüller flow using veering triangulations” https://arxiv.org/abs/1909.00890