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7
votes
Can bilipschitz models of hyperbolic 3-manifolds be made effective?
See Bowditch: link text Systems of bands in hyperbolic 3-manifolds
with an approach to the Brock-Canary-Minsky Theorem (though not through their model manifold) that is, in principle, effective. Thou …
3
votes
What does it mean exactly for a pair of $S^0$'s to be unlinked on a knot $K$?
Think of $S^1$ as the ideal boundary of the hyperbolic plane, then every embedded $S^0\subset S^1$ determines a unique geodesic in the hyperbolic plane. The linking number of two embedded $S^0$s is de …
4
votes
Accepted
What is a half cusp in hyperbolic geometry?
This means that the boundary is geodesic with cusps in the marked points.
The easiest example is a disk with 3 marked points on its boundary. In this case the hyperbolic metric is given by identifica …
4
votes
Accepted
Mostow rigidity for complex hyperbolic manifolds
The general statement of Mostow-Prasad rigidity cited from http://repository.ias.ac.in/36364/1/36364.pdf is as follows.
Let $G$ (resp. $G^\prime$) be a semi-simple analytic group and $\Gamma$ (resp. …
2
votes
Comparing the areas of polygons via equidecomposability in the hyperbolic plane
A proof is given in Example 8.10. of https://www.amazon.de/-/en/Johan-L-Dupont/dp/9810245084 . It is however not at all the elementary proof that you seem to be after.
There is an exact sequence $$H_1 …
15
votes
Accepted
Failure of Mostow rigidity in dimension 2
ad (i):
First consider a Dehn twist at some simple, closed curve in a closed hyperbolic surface. It is obviously a quasi-isometry (as any smooth map between closed surfaces) but not an isometry.
Th …
6
votes
Intuition for Zagier's theorem for $\zeta_K(2)$
Too long for a comment and not sure whether this counts as a big picture, but anyway:
There is a general formula for the covolume of S-arithmetic lattices in symmetric spaces, you find it in Prasad's …
1
vote
Dilogarithm, tetrahedrons, and hyperbolic space
In fact this follows from Stokes' theorem. Consider the 4-simplex $\sigma$ with vertices ABCDE. Since the volume form $\omega$ is closed we have $$\int_{\partial\sigma}\omega=\int_{\sigma} d\omega=0.$ …
1
vote
Accepted
Build a Fuchsian group starting from punctures on a disk
This is a very special case of the Fock-Goncharov construction.
Divide your ideal n-gon into n-2 ideal triangles. Given one cross ratio associated to each edge (i.e., to the 4 ideal vertices of the …
3
votes
Accepted
Conformal boundary and cusp of figure-8 complement
The group of parabolic isometries fixing a point at infinity is isomorphic to ${\mathbb C}$. (Because it acts simply transitively on a horosphere $H$.) The discrete group $\Gamma$ intersects this stab …
7
votes
Accepted
Reconciling Sullivan's theorem with the hyperbolic structure of the Figure–8 knot complement
The statement is only true if you
restrict to geometrically finite hyperbolic metrics (possibly of infinite volume)
and ignore parabolic elements, which basically means that you ignore the boundary …
8
votes
Accepted
Induced homeomorphism from a quasi-isometry between hyperbolic spaces
Properness is already needed to have a well-defined boundary at infinity, i.e., with a topology not depending on the chosen base point. This is Proposition III.3.7 in Bridson-Haefliger, which builds o …
21
votes
Why are Fuchsian groups interesting?
About the relation to fractals: for Fuchsian groups of the first kind, the limit set has Hausdorff dimension 1, i.e., it is not fractal.
However, for all other quasifuchsian groups of the first kind …
10
votes
Accepted
Geometrization & JSJ decomposition with boundary
The work of Jaco-Shalen and Johannson actually handles manifolds with boundary. The theorem they prove (in the language of Johannson's Book) is:
An irreducible, boundary-irreducible 3-manifold with …
2
votes
Accepted
Maximally symmetric hyperbolic 3-manifolds with finite volume
Kojima has proved that every finite group occurs as the symmetry group of some compact hyperbolic 3-manifold. Hence there is nothing like a hyperbolic 3-manifold of maximal symmetry.
The same result …