A new approach to light bulb tricks: Disks in 4-manifolds

Abstract

For a 4-manifold M and a knot k1∂ M with dual sphere G2∂ M, we compute the set D(M;k) of smooth isotopy classes of neat embeddings D2 M with boundary k, using an invariant going back to Dax. Moreover, we construct a group structure on D(M;k) and show that it is usually neither abelian nor finitely generated. We recover all previous results for isotopy classes of spheres with framed duals and relate the group D(M;k) to the mapping class group of M.