On branched covering representation of 4-manifolds

Abstract

We provide new branched covering representations for bounded and/or non-compact 4-manifolds, which extend the known ones for closed 4-manifolds. Assuming M to be a connected oriented PL 4-manifold, our main results are the following: (1) if M is compact with (possibly empty) boundary, there exists a simple branched cover p:M S4 - Int(B41 … B4n), where the B4i's are disjoint PL 4-balls, n ≥ 0 is the number of boundary components of M; (2) if M is open, there exists a simple branched cover p : M S4 - End M, where End M is the end space of M tamely embedded in S4. In both cases, the degree d(p) and the branching set Bp of p can be assumed to satisfy one of these conditions: (1) d(p)=4 and Bp is a properly self-transversally immersed locally flat PL surface; (2) d(p)=5 and Bp is a properly embedded locally flat PL surface. In the compact (resp. open) case, by relaxing the assumption on the degree we can have B4 (resp. R4) as the base of the covering. We also define the notion of branched covering between topological manifolds, which extends the usual one in the PL category. In this setting, as an interesting consequence of the above results, we prove that any closed oriented topological 4-manifold is a 4-fold branched covering of S4. According to almost-smoothability of 4-manifolds, this branched cover could be wild at a single point.