Concordance of Surfaces and the Freedman-Quinn Invariant

Abstract

We prove a concordance version of the 4-dimensional light bulb theorem for π1-negligible compact orientable surfaces, where there is a framed but not necessarily embedded dual sphere. That is, we show that if F0 and F1 are such surfaces in a 4-manifold X that are homotopic and there exists an immersed framed 2-sphere G in X intersecting F0 geometrically once, then F0 and F1 are concordant if and only if their Freedman-Quinn invariant fq vanishes. The proof of the main result involves computing fq in terms of intersections in the universal covering space and then applying work of Sunukjian in the simply-connected case.