diff -r c5a35886cd82 -r 93ce0ba3d2d7 text/basic_properties.tex --- a/text/basic_properties.tex Mon Jul 12 17:29:25 2010 -0600 +++ b/text/basic_properties.tex Wed Jul 14 11:06:11 2010 -0600 @@ -6,8 +6,8 @@ In this section we complete the proofs of Properties 2-4. Throughout the paper, where possible, we prove results using Properties 1-4, rather than the actual definition of blob homology. -This allows the possibility of future improvements to or alternatives on our definition. -In fact, we hope that there may be a characterisation of blob homology in +This allows the possibility of future improvements on or alternatives to our definition. +In fact, we hope that there may be a characterization of the blob complex in terms of Properties 1-4, but at this point we are unaware of one. Recall Property \ref{property:disjoint-union}, @@ -67,10 +67,8 @@ This follows from Properties \ref{property:disjoint-union} and \ref{property:contractibility}. \end{proof} -Define the {\it support} of a blob diagram to be the union of all the +Recall the definition of the support of a blob diagram as 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} @@ -93,9 +91,7 @@ \end{proof} For the next proposition we will temporarily restore $n$-manifold boundary -conditions to the notation. - -Let $X$ be an $n$-manifold, $\bd X = Y \cup Y \cup Z$. +conditions to the notation. Let $X$ be an $n$-manifold, with $\bd X = Y \cup Y \cup Z$. Gluing the two copies of $Y$ together yields an $n$-manifold $X\sgl$ with boundary $Z\sgl$. Given compatible fields (boundary conditions) $a$, $b$ and $c$ on $Y$, $Y$ and $Z$, @@ -103,6 +99,7 @@ If $b = a$, then we can glue up blob diagrams on $X$ to get blob diagrams on $X\sgl$. This proves Property \ref{property:gluing-map}, which we restate here in more detail. +\todo{This needs more detail, because this is false without careful attention to non-manifold components, etc.} \textbf{Property \ref{property:gluing-map}.}\emph{ There is a natural chain map