Smooth stable isotopy of topologically isotopic surfaces

Abstract

A stabilisation of a 4-manifold X is the connected sum of X with some number of copies of S2× S2. If two smooth surfaces in a 4-manifold are topologically isotopic, we investigate whether they must moreover be smoothly isotopic in some stabilisation of X. We prove this result holds whenever the surfaces are trivial in the Z/2-homology of X. We also produce a large class of fundamental groups of the ambient 4-manifold for which the result holds; this class includes free products of classical knot groups and, in particular, free groups.