Rank gradients of infinite cyclic covers of Kaehler manifolds

Abstract

Given a Kaehler group G and a primitive class φ ∈ H1(G;Z), we show that the rank gradient of (G;φ) is zero if and only if Ker φ is finitely generated. Using this approach, we give a quick proof of the fact (originally due to Napier and Ramachandran) that Kaehler groups are not properly ascending or descending HNN extensions. Further investigation of the properties of Bieri-Neumann-Strebel invariants of Kaehler groups allows us to show that a large class of groups of orientation-preserving PL homeomorphisms of an interval, which generalize Thompson's group F, are not Kaehler.