Kirby-Thompson distance for trisections of knotted surfaces

Abstract

We adapt work of Kirby-Thompson and Zupan to define an integer invariant L(T) of a bridge trisection T of a smooth surface K in S4 or B4. We show that when L(T)=0, then the surface K is unknotted. We also show show that for a trisection T of an irreducible surface, bridge number produces a lower bound for L(T). Consequently, L can be arbitrarily large.