Stein trisections and homotopy 4-balls

Abstract

A homotopy 4-ball is a smooth 4-manifold with boundary S3 that is homotopy-equivalent to the standard B4. The smooth 4-dimensional Schoenflies problem asks whether every homotopy 4-ball in S4 (or equivalently C2) is standard. It is well-known that if a homotopy 4-ball embeds as a compact, pseudoconvex domain in a Stein surface, then it must be standard. In this paper, we describe a compelling reimbedding construction for homotopy 4-balls in C2. In particular, given a homotopy 4-ball in C2, we construct a diffeomorphic domain that is the union of three pseudoconvex domains. Moreover, we give an analytic criterion that ensures this domain is a standard 4-ball.