equal
deleted
inserted
replaced
396 for example product boundary conditions or take the union over all boundary conditions. |
396 for example product boundary conditions or take the union over all boundary conditions. |
397 \nn{maybe should not emphasize this case, since it's ``better" in some sense |
397 \nn{maybe should not emphasize this case, since it's ``better" in some sense |
398 to think of these guys as affording a representation |
398 to think of these guys as affording a representation |
399 of the $n{+}1$-category associated to $\bd F$.} |
399 of the $n{+}1$-category associated to $\bd F$.} |
400 |
400 |
|
401 \item \nn{should add bordism $n$-cat} |
|
402 |
401 \end{itemize} |
403 \end{itemize} |
402 |
404 |
403 |
405 |
404 Examples of $A_\infty$ $n$-categories: |
406 Examples of $A_\infty$ $n$-categories: |
405 \begin{itemize} |
407 \begin{itemize} |
411 |
413 |
412 \item |
414 \item |
413 Given a plain $n$-category $C$, |
415 Given a plain $n$-category $C$, |
414 define $\cC(X; c) = \bc^C_*(X\times F; c)$, where $X$ is an $n$-ball |
416 define $\cC(X; c) = \bc^C_*(X\times F; c)$, where $X$ is an $n$-ball |
415 and $\bc^C_*$ denotes the blob complex based on $C$. |
417 and $\bc^C_*$ denotes the blob complex based on $C$. |
|
418 |
|
419 \item \nn{should add $\infty$ version of bordism $n$-cat} |
416 |
420 |
417 \end{itemize} |
421 \end{itemize} |
418 |
422 |
419 |
423 |
420 |
424 |