Enrichment through variation:

Abstract: "We show that, for a closed bicategory W, the 2- category of tensored W-categories and all W-functors between them is equivalent to the 2-category of closed W-representations and maps of such, which in turn is isomorphic to a full sub-2-category of Lax(W, Cat). We further show that, i...

Ausführliche Beschreibung

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Bibliographische Detailangaben
Hauptverfasser: Gordon, Robert (VerfasserIn), Power, Anthony John (VerfasserIn)
Format: Buch
Sprache:English
Veröffentlicht: Edinburgh 1993
Schriftenreihe:Laboratory for Foundations of Computer Science <Edinburgh>: LFCS report series 254
Schlagworte:
Zusammenfassung:Abstract: "We show that, for a closed bicategory W, the 2- category of tensored W-categories and all W-functors between them is equivalent to the 2-category of closed W-representations and maps of such, which in turn is isomorphic to a full sub-2-category of Lax(W, Cat). We further show that, if [omega] is a locally dense subbicategory of W and W is biclosed, then the 2-category of W-categories having tensors with 1- cells of [omega] embeds fully into the 2-category of [omega]- representations
This allows us to generalize Gabriel-Ulmer duality to W- categories and to prove, for W-categories, that for locally finitely presentable A and for B admitting finite tensors and filtered colimits, the category of W-functors from A[subscript f] to B is equivalent to that of finitary W-functors from A to B.
Beschreibung:22 S.

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