Sébastien Alvarez, Joaquín Brum, Matilde Martínez, Rafael Potrie
Published 2019-06-24Version 1
We construct minimal laminations by hyperbolic surfaces whose generic leaf is a disk and contain any prescribed family of surfaces and with a precise control of the topologies of the surfaces that appear. The laminations are constructed via towers of finite coverings of surfaces for which we need to develop a relative version of residual finiteness which may be of independent interest. The main step in establishing this relative version of residual finiteness is to obtain finite covers with control on the \emph{second systole} of the surface, which is done in the appendix. In a companion paper, the case of other generic leaves is treated.
Comments: With an appendix by the authors and Maxime Wolff. 42 pages. 11 figures
Prime orthogeodesics, concave cores and families of identities on hyperbolic surfaces
Quantifying the sparseness of simple geodesics on hyperbolic surfaces
A relative version of the Turaev-Viro invariants and the volume of hyperbolic polyhedral 3-manifolds
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