# HG changeset patch # User kevin@6e1638ff-ae45-0410-89bd-df963105f760 # Date 1246808589 0 # Node ID ffcd1a5eafd8f36e9a11fdfc01942e5d58c641c9 # Parent c3aace2330acd6a29c3913d26221af0f24d7a006 ... diff -r c3aace2330ac -r ffcd1a5eafd8 text/evmap.tex --- a/text/evmap.tex Sat Jul 04 18:44:35 2009 +0000 +++ b/text/evmap.tex Sun Jul 05 15:43:09 2009 +0000 @@ -301,12 +301,59 @@ An easy variation on the above lemma shows that $e_{i,m}$ and $e_{i,m+1}$ are $m$-th order homotopic. +Next we show how to homotope chains in $CD_*(X)\ot \bc_*(X)$ to one of the +$G_*^{i,m}$. +Choose a monotone decreasing sequence of real numbers $\gamma_j$ converging to zero. +Let $\cU_j$ denote the open cover of $X$ by balls of radius $\gamma_j$. +Let $h_j: CD_*(X)\to CD_*(X)$ be a chain map homotopic to the identity whose image is spanned by diffeomorphisms with support compatible with $\cU_j$, as described in Lemma \ref{xxxxx}. +Recall that $h_j$ and also its homotopy back to the identity do not increase +supports. +Define +\[ + g_j \deq h_j\circ h_{j-1} \circ \cdots \circ h_1 . +\] +The next lemma says that for all generators $p\ot b$ we can choose $j$ large enough so that +$g_j(p)\ot b$ lies in $G_*^{i,m}$, for arbitrary $m$ and sufficiently large $i$ +(depending on $b$, $n = \deg(p)$ and $m$). + +\begin{lemma} +Fix a blob diagram $b$, a homotopy order $m$ and a degree $n$ for $CD_*(X)$. +Then there exists a constant $k_{bmn}$ such that for all $i \ge k_{bmn}$ +there exists another constant $j_i$ such that for all $j \ge j_i$ and all $p\in CD_n(X)$ +we have $g_j(p)\ot b \in G_*^{i,m}$. +\end{lemma} + +\begin{proof} +Let $c$ be a subset of the blobs of $b$. +There exists $l > 0$ such that $\Nbd_u(c)$ is homeomorphic to $|c|$ for all $u < l$ +and all such $c$. +(Here we are using a piecewise smoothness assumption for $\bd c$). + +Let $r = \deg(b)$. + +Choose $k = k_{bmn}$ such that +\[ + (r+n+m+1)\ep_k < l +\] +and +\[ + n\cdot (3\delta_k\cdot(r+n+m+1)) < \ep_k . +\] +Let $i \ge k_{bmn}$. +Choose $j = j_i$ so that +\[ + 3\cdot(r+n+m+1)\gamma_j < \ep_i +\] +and also so that for any subset $S\sub X$ of diameter less than or equal to +$2n\gamma_j$ we have that $\Nbd_u(S)$ is +\end{proof} + + \medskip \noop{ - \begin{lemma} \end{lemma} @@ -314,7 +361,6 @@ \end{proof} - }