On the smoothing theory delooping of disc diffeomorphism and embedding spaces
Abstract
The celebrated Morlet-Burghelea-Lashof-Kirby-Siebenmann smoothing theory theorem states that the group Diff∂(Dn) of diffeomorphisms of a disc Dn relative to the boundary is equivalent to n+1(PLn/On) for any n≥ 1 and to n+1(TOPn/On) for n≠ 4. We revise smoothing theory results to show that the delooping generalizes to different versions of disc smooth embedding spaces relative to the boundary, namely the usual embeddings, those modulo immersions, and framed embeddings. The latter spaces deloop as Emb∂fr(Dm,Dn)m+1(On\!\!n/PLn,m) m+1(On\!\!n/TOPn,m) for any n≥ m≥ 1 (n≠ 4 for the second equivalence), where the left-hand side in the case n-m=2 or (n,m)=(4,3) should be replaced by the union of the path-components of PL-trivial knots (framing being disregarded). Moreover, we show that for n≠ 4, the delooping is compatible with the Budney Em+1-action. We use this delooping to combine the Hatcher Om+1-action and the Budney Em+1-action into a framed little discs operad Em+1Om+1-action on Emb∂fr(Dm,Dn).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.