Embedding Calculus, Goodwillie Calculus and Link Invariants

Abstract

We study Goodwillie-Weiss embedding calculus through its relationship with Goodwillie's functor calculus. Specifically, building on a result of Tillmann and Weiss, we construct a functorial complement for \(Tn\)-embeddings that takes values in Heuts's categorical \(n\)-excisive approximation of pointed spaces. We also establish an analogue of Stallings' theorem for lower central series in the context of \(Tn\)-embeddings of \(P × I\) into \(Dd\) for any compact manifold \(P\). As an application, we show that the embedding tower of string links detects Milnor invariants.

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