On the transverse invariant and braid dynamics

Abstract

Suppose (B,π) is an open book supporting (Y,), where the binding B is possibly disconnected, and K is a braid about this open book. Then B K is naturally a transverse link in (Y,). We prove that the transverse link invariant in knot Floer homology, \[t(B K)∈ HFK(-Y,B K),\] defined in [BVV13] is always nonzero. This generalizes the main results of Etnyre and Vela-Vick in [VV11, EVV10]. As an application, we show that if K is braided about an open book with connected binding, and has fractional Dehn twist coefficient greater than one, then t(K) 0. This generalizes a result of Plamenevskaya [PLA15] for classical braids.