# HG changeset patch # User kevin@6e1638ff-ae45-0410-89bd-df963105f760 # Date 1268941246 0 # Node ID 77b0cdeb0fcd1818dda0f023a6e0839ded7c70d5 # Parent d31a9c505f29c755dcfc65aee0f7ce86c68e9204 ... diff -r d31a9c505f29 -r 77b0cdeb0fcd text/basic_properties.tex --- a/text/basic_properties.tex Tue Mar 16 14:11:07 2010 +0000 +++ b/text/basic_properties.tex Thu Mar 18 19:40:46 2010 +0000 @@ -51,6 +51,40 @@ For fields based on $n$-categories, $H_0(\bc_*(B^n; c)) \cong \mor(c', c'')$, where $(c', c'')$ is some (any) splitting of $c$ into domain and range. +\begin{cor} \label{disj-union-contract} +If $X$ is a disjoint union of $n$-balls, then $\bc_*(X; c)$ is contractible. +\end{cor} + +\begin{proof} +This follows from \ref{disjunion} and \ref{bcontract}. +\end{proof} + +Define the {\it support} of a blob diagram to be the union of all the +blobs of the diagram. +Define the support of a linear combination of blob diagrams to be the union of the +supports of the constituent diagrams. +For future use we prove the following lemma. + +\begin{lemma} \label{support-shrink} +Let $L_* \sub \bc_*(X)$ be a subcomplex generated by some +subset of the blob diagrams on $X$, and let $f: L_* \to L_*$ +be a chain map which does not increase supports and which induces an isomorphism on +$H_0(L_*)$. +Then $f$ is homotopic (in $\bc_*(X)$) to the identity $L_*\to L_*$. +\end{lemma} + +\begin{proof} +We will use the method of acyclic models. +Let $b$ be a blob diagram of $L_*$, let $S\sub X$ be the support of $b$, and let +$r$ be the restriction of $b$ to $X\setminus S$. +Note that $S$ is a disjoint union of balls. +Assign to $b$ the acyclic (in positive degrees) subcomplex $T(b) \deq r\bullet\bc_*(S)$. +note that if a diagram $b'$ is part of $\bd b$ then $T(B') \sub T(b)$. +Both $f$ and the identity are compatible with $T$ (in the sense of acyclic models), +so $f$ and the identity map are homotopic. +\end{proof} + + \medskip \nn{Maybe there is no longer a need to repeat the next couple of props here, since we also state them in the introduction. diff -r d31a9c505f29 -r 77b0cdeb0fcd text/hochschild.tex --- a/text/hochschild.tex Tue Mar 16 14:11:07 2010 +0000 +++ b/text/hochschild.tex Thu Mar 18 19:40:46 2010 +0000 @@ -184,7 +184,7 @@ We want to define a homotopy inverse to the above inclusion, but before doing so we must replace $\bc_*(S^1)$ with a homotopy equivalent subcomplex. -Let $J_* \sub \bc_*(S^1)$ be the subcomplex where * does not lie to the boundary +Let $J_* \sub \bc_*(S^1)$ be the subcomplex where * does not lie on the boundary of any blob. Note that the image of $i$ is contained in $J_*$. Note also that in $\bc_*(S^1)$ (away from $J_*$) a blob diagram could have multiple (nested) blobs whose