Let M be a torus bundle over S¹ with an orientation preserving Anosov monodromy. The manifold M admits a geometric structure modeled on Sol. We prove that the Sol structure can be deformed into singular hyperbolic cone structures whose singular locus Σ ⊂ M is the mapping torus of the fixed point of the monodromy. ¶ The hyperbolic cone metrics are parametred by the cone angle α in the interval (0, 2π). When α → 2π, the cone manifolds collapse to the basis of the fibration S¹, and they can be rescaled in the direction of the fibers to converge to the Sol manifold.

Publié le : 2001-11-14
Classification: 

@article{1090349448,
     author = {Heusener, Michael and Porti, Joan and Su\'arez, Eva},
     title = {Regenerating Singular Hyperbolic Structures from Sol},
     journal = {J. Differential Geom.},
     volume = {57},
     number = {2},
     year = {2001},
     pages = { 439-478},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1090349448}
}

Heusener, Michael; Porti, Joan; Suárez, Eva. Regenerating Singular Hyperbolic Structures from Sol. J. Differential Geom., Tome 57 (2001) no. 2, pp.  439-478. http://gdmltest.u-ga.fr/item/1090349448/