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CAT(0) and CAT(-1) fillings of hyperbolic manifolds

We give new examples of hyperbolic and relatively hyperbolic groups of cohomological dimension $d$ for all $d\geq 4$. These examples result from applying CAT$(0)$/CAT$(-1)$ filling constructions (based on singular doubly warped products) to finite volume hyperbolic manifolds with toral cusps. The groups obtained have a number of interesting properties, which are established by analyzing their boundaries at infinity by a kind of Morse-theoretic technique, related to but distinct from ordinary and combinatorial Morse theory.

preprint2008arXivOpen access
Koji FujiwaraJason Fox Manning
math.GRmath.GT
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Koji FujiwaraJason Fox Manning

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