72 For an $A_\infty$ $n$-category, we associate a chain complex instead of a vector space to each such $B$ and ask that the action of 

    72 For an $A_\infty$ $n$-category, we associate a chain complex instead of a vector space to each such $B$ and ask that the action of 

    73 homeomorphisms extends to a suitably defined action of the complex of singular chains of homeomorphisms.

    73 homeomorphisms extends to a suitably defined action of the complex of singular chains of homeomorphisms.

    74 The axioms for an $A_\infty$ $n$-category are designed to capture two main examples: the blob complexes of $n$-balls labelled by a 

    74 The axioms for an $A_\infty$ $n$-category are designed to capture two main examples: the blob complexes of $n$-balls labelled by a 

    75 topological $n$-category, and the complex $\CM{-}{T}$ of maps to a fixed target space $T$.

    75 topological $n$-category, and the complex $\CM{-}{T}$ of maps to a fixed target space $T$.

    76 

    76 

    77 In \S \ref{ss:ncat_fields}  we explain how to construct a system of fields from a topological $n$-category 

    81 In \S \ref{ss:ncat_fields}  we explain how to construct a system of fields from a topological $n$-category 

    78 (using a colimit along certain decompositions of a manifold into balls). 

    82 (using a colimit along certain decompositions of a manifold into balls). 

    79 With this in hand, we write $\bc_*(M; \cC)$ to indicate the blob complex of a manifold $M$ 

    83 With this in hand, we write $\bc_*(M; \cC)$ to indicate the blob complex of a manifold $M$ 

    80 with the system of fields constructed from the $n$-category $\cC$. 

    84 with the system of fields constructed from the $n$-category $\cC$. 

    81 %\nn{KW: I don't think we use this notational convention any more, right?}

    85 %\nn{KW: I don't think we use this notational convention any more, right?}