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784 \nn{should we spell this out?} |
784 \nn{should we spell this out?} |
785 |
785 |
786 \nn{Should remark that this is just Lurie's topological chiral homology construction |
786 \nn{Should remark that this is just Lurie's topological chiral homology construction |
787 applied to $n$-balls (check this). |
787 applied to $n$-balls (check this). |
788 Hmmm... Does Lurie do both framed and unframed cases?} |
788 Hmmm... Does Lurie do both framed and unframed cases?} |
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789 |
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790 Conversely, one can show that a topological $A_\infty$ $n$-category $\cC$, where the $k$-morphisms |
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791 $\cC(X)$ are trivial (single point) for $k<n$, gives rise to |
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792 an $\cE\cB_n$-algebra. |
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793 \nn{The paper is already long; is it worth giving details here?} |
789 \end{example} |
794 \end{example} |
790 |
795 |
791 |
796 |
792 |
797 |
793 |
798 |