diff -r d2430f0a14f6 -r 4c0492f2a662 blob1.tex
--- a/blob1.tex	Mon Sep 27 21:09:07 2010 -0700
+++ b/blob1.tex	Wed Sep 29 23:06:44 2010 -0700
@@ -24,8 +24,8 @@
 \begin{abstract}
 Given an $n$-manifold $M$ and an $n$-category $\cC$, we define a chain complex
 (the ``blob complex") $\bc_*(M; \cC)$.
-The blob complex can be thought of as a derived category version of the Hilbert space of a TQFT, 
-or as a generalization of Hochschild homology to $n$-categories and $n$-manifolds.
+The blob complex can be thought of as a derived category analogue of the Hilbert space of a TQFT, 
+and also as a generalization of Hochschild homology to $n$-categories and $n$-manifolds.
 It enjoys a number of nice formal properties, including a higher dimensional
 generalization of Deligne's conjecture about the action of the little disks operad on Hochschild cochains.
 Along the way, we give a definition of a weak $n$-category with strong duality which
@@ -84,7 +84,7 @@
 \bibliography{bibliography/bibliography}
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-This paper is available online at \arxiv{1009.5025}, and at
+This paper is available online at \arxiv{?????}, and at
 \url{http://tqft.net/blobs},
 and at \url{http://canyon23.net/math/}.