Rank gradient of small covers
arXiv:1301.4369 · doi:10.2140/pjm.2013.266.23
Abstract
We prove that if $M \longrightarrow P$ is a small cover of a compact right-angled hyperbolic polyhedron $P$ then $M$ admits a cofinal tower of finite sheeted covers with positive rank gradient. As a corollary, if $Ï_1(M)$ is commensurable with the reflection group of $P$, then $M$ admits a cofinal tower of finite sheeted covers with positive rank gradient.
accepted in Pacific Journal of Mathematics