Distances between surfaces in 4-manifolds

Abstract

If and ' are homotopic embedded surfaces in a 4-manifold then they may be related by a regular homotopy (at the expense of introducing double points) or by a sequence of stabilisations and destabilisations (at the expense of adding genus). This naturally gives rise to two integer-valued notions of distance between the embeddings: the singularity distance dsing(,') and the stabilisation distance dst(,'). Using techniques similar to those used by Gabai in his proof of the 4-dimensional light-bulb theorem, we prove that dst(,')≤ dsing(,')+1.