Self-Referential Discs and the Light Bulb Lemma

Abstract

We show how self-referential discs in 4-manifolds lead to the construction of pairs of discs with a common geometrically dual sphere which are homotopic rel ∂, concordant and coincide near their boundaries, yet are not properly isotopic. This occurs in manifolds without 2-torsion in their fundamental group, e.g. the boundary connect sum of S2× D2 and S1× B3, thereby exhibiting phenomena not seen with spheres. On the other hand we show that two such discs are isotopic rel ∂ if the manifold is simply connected. We construct in S2× D2 S1× B3 a properly embedded 3-ball properly homotopic to a z0× B3 but not properly isotopic to z0× B3.