Small asymptotic translation lengths of pseudo-Anosov maps on the curve complex

Abstract

Let M be a hyperbolic fibered 3-manifold with b1(M) ≥ 2 and let S be a fiber with pseudo-Anosov monodromy . We show that there exists a sequence (Rn, n) of fibers and monodromies contained in the fibered cone of (S,) such that the asymptotic translation length of n on the curve complex C(Rn) behaves asymptotically like 1/|(Rn)|2. As applications, we can reprove the previous result by Gadre--Tsai that the minimal asymptotic translation length of a closed surface of genus g asymptotically behaves like 1/g2. We also show that this also holds for the cases of hyperelliptic mapping class group and hyperelliptic handlebody group.