Concordance of spheres in 4-manifolds with an immersed dual sphere

Abstract

Let S0 and S1 be two homotopic, oriented 2-spheres embedded in an orientable 4-manifold X. After discussing several operations for modifying an immersion of a 3-manifold into a 5-manifold, we discuss the Freedman--Quinn (fq) and Stong (stong) concordance obstructions. When these are defined for the pair S0,S1, they are defined in terms of the self-intersection set of a regular homotopy from S0 to S1. When S0 has an immersed dual sphere, we see that under some mild topological conditions on X, the invariants fq and stong are a complete set of concordance obstructions. This work is an adaption of the methods of Richard Stong to the context of concordances of 2-spheres.

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