Classification of boundary Lefschetz fibrations over the disc

Abstract

We show that a four-manifold admits a boundary Lefschetz fibration over the disc if and only if it is diffeomorphic to S1 × S3\# n C P2, \# mC P2 \#nC P2 or \# m (S2 × S2). Given the relation between boundary Lefschetz fibrations and stable generalized complex structures, we conclude that the manifolds S1 × S3\# n C P2, \#(2m+1)C P2 \#nC P2 and \# (2m+1) S2 × S2 admit stable structures whose type change locus has a single component and are the only four-manifolds whose stable structure arise from boundary Lefschetz fibrations over the disc.