Grasper families of spheres in S2 × D2 and barbell diffeomorphisms of S1× S2 × I
Abstract
We show that the fundamental group of framed circles in S1 × D3 injects into the fundamental group of framed spheres in S2× D2, so that the cokernel is the fundamental group of framed neat disks in D4. In particular, grasper families of circles give rise to countably many nontrivial families of spheres. Ambient extensions of either of these two types of families induce the same barbell diffeomorphisms of S1× S2× I. We give two proofs that these diffeomorphisms are nontrivial and pairwise distinct. This implies infinite generation of the abelian group of isotopy classes of diffeomorphisms of S1× S2× I that are pseudo-isotopic to the identity, recovering a result of Singh.
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