Traces of links and simply connected 4-manifolds

Abstract

We study the set SM of framed smoothly slice links which lie on the boundary of the complement of a 1-handlebody in a closed, simply connected, smooth 4-manifold M. We show that SM is well-defined and describe how it relates to exotic phenomena in dimension four. In particular, in the case when X is smooth, with a handle decompositions with no 1-handles and homeomorphic to but not smoothly embeddable in D4, our results tell us that X is exotic if and only if there is a link L S3 which is smoothly slice in X, but not in D4. Furthermore, we extend the notion of high genus 2-handle attachment, introduced by Hayden and Piccirillo, to prove that exotic 4-disks that are smoothly embeddable in D4, and therefore possible counterexamples to the smooth 4-dimensional Sch\"onflies conjecture, cannot be distinguished from D4 only by comparing the slice genus functions of links.