Systoles of Hyperbolic Manifolds
Abstract
We show that for every n≥ 2 and any ε>0 there exists a compact hyperbolic n-manifold with a closed geodesic of length less than ε. When ε is sufficiently small these manifolds are non-arithmetic, and they are obtained by a generalised inbreeding construction which was first suggested by Agol for n=4. We also show that for n≥ 3 the volumes of these manifolds grow at least as 1/εn-2 when ε 0.
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