Efficient cycles of hyperbolic manifolds

Abstract

Let N be a complete finite-volume hyperbolic n-manifold. An efficient cycle for N is the limit (in an appropriate measure space) of a sequence of fundamental cycles whose 1-norm converges to the simplicial volume of N. Gromov and Thurston's smearing construction exhibits an explicit efficient cycle, and Jungreis and Kuessner proved that, in dimension n≥ 3, such cycle actually is the unique efficient cycle for a huge class of finite volume hyperbolic manifolds, including all the closed ones. In this paper we prove that, for n≥ 3, the class of finite-volume hyperbolic manifolds for which the uniqueness of the efficient cycle does not hold is exactly the commensurability class of the figure-8 knot complement (or, equivalently, of the Gieseking manifold).