Braiding link cobordisms and non-ribbon surfaces

Abstract

We define the notion of a braided link cobordism in S3 × [0,1], which generalizes Viro's closed surface braids in R4. We prove that any properly embedded oriented surface W ⊂ S3 × [0,1] is isotopic to a surface in this special position, and that the isotopy can be taken rel boundary when ∂ W already consists of closed braids. These surfaces are closely related to another notion of surface braiding in D2 × D2, called braided surfaces with caps, which are a generalization of Rudolph's braided surfaces. We mention several applications of braided surfaces with caps, including using them to apply algebraic techniques from braid groups to studying surfaces in 4-space, as well as constructing singular fibrations on smooth 4-manifolds from a given handle decomposition.