-
subject of
geometric group theory, an
acylindrically hyperbolic group is a
group admitting a non-elementary '
acylindrical'
isometric action on some geodesic...
- In mathematics, an
atoroidal 3-manifold is one that does not
contain an
essential torus.
There are two
major variations in this terminology: an essential...
-
discontinuity of the action. A
group is said to be
acylindrically hyperbolic if it
admits a non-elementary
acylindrical action on a (not
necessarily proper) Gromov-hyperbolic...
-
uniformly on a cube,
tetrahedron or
other Platonic solid. Similarly, the
acylindricity c {\displaystyle c} is
defined by c = d e f λ y 2 − λ x 2 {\displaystyle...
- .449B. doi:10.1007/BF01239522. S2CID 121136037. Sela, Zlil (1997). "
Acylindrical accessibility for groups".
Inventiones Mathematicae. 129 (3): 527–565...
-
William Thurston,
Hyperbolic structures on 3-manifolds. I.
Deformation of
acylindrical manifolds. Ann. of Math. (2) 124 (1986), no. 2, 203–246.
William Thurston...
-
starting with "Hyperbolic
structures on 3-manifolds. I.
Deformation of
acylindrical manifolds" (Ann. of Math. (2) 124 (1986), no. 2, 203–246), that revolutionized...
-
faces of a bar
composed of 5
laser diodes, can be
imaged by
means of 4 (
acylindrical)
cylinder lenses onto an
image plane with 5
spots each with a size of...
- particular, all
groups that do not
contain non-abelian free subgroups);
Acylindrical accessibility results for
finitely presented (Sela, Delzant) and finitely...
- doi:10.2307/2951832, JSTOR 2951832, MR 1469317 Sela, Zlil (1997), "
Acylindrical accessibility for groups",
Inventiones Mathematicae, 129 (3): 527–565...
