Families of Arcs in 4-Manifolds and Maps of Configuration Spaces
Abstract
In this thesis we construct 3-parameter families G(p,q,r) of embedded arcs with fixed boundary in a 4-manifold. We then analyze these elements of π3Emb∂(I,M) using embedding calculus by studying the induced map from the embedding space to ``Taylor approximations" TkEmb∂(I,M). We develop a diagrammatic framework inspired by cubical ω-groupoids to depict G(p,q,r) and related homotopies. We use this framework extensively in Chapter 4 to show explicitly that G(p,q,r) is trivial in π3T3Emb∂(I,M) (however, we conjecture that it is non-trivial in π3T4Emb∂(I,M)). In Chapter 5 we use the Bousfield-Kan spectral sequence for homotopy groups of cosimplicial spaces to show that the rational homotopy group πQ3Emb∂(I,S1 × B3) is Q. This thesis extends work by Budney and Gabai which proves analogous results for π2Emb∂(I,M).
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