Articolo su rivista, estratto dalla tesi di dottorato. A finite-volume hyperbolic 3–manifold geometrically bounds if it is the geodesic boundary of a finite-volume hyperbolic 4–manifold. We construct here an example of a noncompact, finite-volume hyperbolic 3–manifold that geometrically bounds. The 3–manifold is the complement of a link with eight components, and its volume is roughly equal to 29:311.
A geometrically bounding hyperbolic link complement / Leone Slavich. - In: ALGEBRAIC AND GEOMETRIC TOPOLOGY. - ISSN 1472-2747. - ELETTRONICO. - 15:(2015), pp. 1175-1197. [10.2140/agt.2015.15.1175]
A geometrically bounding hyperbolic link complement
SLAVICH, LEONE
2015
Abstract
Articolo su rivista, estratto dalla tesi di dottorato. A finite-volume hyperbolic 3–manifold geometrically bounds if it is the geodesic boundary of a finite-volume hyperbolic 4–manifold. We construct here an example of a noncompact, finite-volume hyperbolic 3–manifold that geometrically bounds. The 3–manifold is the complement of a link with eight components, and its volume is roughly equal to 29:311.
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