Singular branched covers of four-manifolds

Abstract

Consider a dihedral cover f: Y X with X and Y four-manifolds and f branched along an oriented surface embedded in X with isolated cone singularities. We prove that only a slice knot can arise as the unique singularity on an irregular dihedral cover f: Y S4 if Y is homotopy equivalent to CP2 and construct an explicit infinite family of such covers with Y diffeomorphic to CP2. An obstruction to a knot being homotopically ribbon arises in this setting, and we describe a class of potential counter-examples to the Slice-Ribbon Conjecture. Our tools include lifting a trisection of a singularly embedded surface in a four-manifold X to obtain a trisection of the corresponding irregular dihedral branched cover of X, when such a cover exists. We also develop a combinatorial procedure to compute, using a formula by the second author, the contribution to the signature of the covering manifold which results from the presence of a singularity on the branching set.