The 4-Dimensional Light Bulb Theorem
Abstract
For embedded 2-spheres in a 4-manifold sharing the same embedded transverse sphere homotopy implies isotopy, provided the ambient 4-manifold has no 2-torsion in the fundamental group. This gives a generalization of the classical light bulb trick to 4-dimensions, the uniqueness of spanning discs for a simple closed curve in S4 and π0(0(S2× D2)/0(B4))=1. In manifolds with 2-torsion, one surface can be put into a normal form relative to the other.
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