# HG changeset patch # User Kevin Walker # Date 1289781216 28800 # Node ID e448415ad80a500a31332dd681b959dfcd9cfa77 # Parent b66138a1cde86c1eb8e54efb7a3724ec705001c4# Parent 28b016b716b112d21d64f3c0024ddbd4acad0d62 Automated merge with https://tqft.net/hg/blob/ diff -r b66138a1cde8 -r e448415ad80a pnas/pnas.tex --- a/pnas/pnas.tex Sun Nov 14 16:15:17 2010 -0800 +++ b/pnas/pnas.tex Sun Nov 14 16:33:36 2010 -0800 @@ -761,6 +761,17 @@ \end{itemize} \end{thm} +\begin{proof} (Sketch.) +The $A_\infty$ action of $\bc_*(Y)$ follows from the naturality of the blob complex with respect to gluing +and the $C_*(\Homeo(-))$ action of Theorem \ref{thm:evaluation}. + +Let $T_*$ denote the self tensor product of $\bc_*(X)$, which is a homotopy colimit. +Let $X_{\mathrm gl}$ denote $X$ glued to itself along $Y$. +There is a tautological map from the 0-simplices of $T_*$ to $\bc_*(X_{\mathrm gl})$, +and this map can be extended to a chain map on all of $T_*$ by sending the higher simplices to zero. +Constructing a homotopy inverse to this natural map invloves making various choices, but one can show that the +choices form contractible subcomplexes and apply the acyclic models theorem. +\end{proof} We next describe the blob complex for product manifolds, in terms of the $A_\infty$ blob complex of the $A_\infty$ $n$-categories constructed as above. @@ -777,7 +788,11 @@ The statement can be generalized to arbitrary fibre bundles, and indeed to arbitrary maps (see \cite[\S7.1]{1009.5025}). -\nn{Theorem \ref{thm:product} is proved in \S \ref{ss:product-formula}, and Theorem \ref{thm:gluing} in \S \ref{sec:gluing}.} +\begin{proof} (Sketch.) + +\end{proof} + +%\nn{Theorem \ref{thm:product} is proved in \S \ref{ss:product-formula}, and Theorem \ref{thm:gluing} in \S \ref{sec:gluing}.} \section{Higher Deligne conjecture} \label{sec:applications}