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For questions involving one or more categorical dimensions, or involving homotopy coherent categorical structures.

3 votes
0 answers
149 views

Displaying displayed categories

Displayed categories provide a natural categorification from classifying functions to the world of functors. The spirit of the idea is to encode a functor $ F: D \to C $ using a suitable 2-functor (la …
1 vote
0 answers
68 views

Underdetermined Polynomial $(\infty ,1)$-Functors

Is there any sense in which the full subcategory of n-excisive functors (on spectra or on pointed spaces) on those functors $F$ which satisfy a set of distinct (modulo homotopy equivalence) equations …
2 votes
1 answer
292 views

Can tangent ($\infty$,1)-categories be described in terms of the higher Grothendieck constru...

Given a locally presentable ($\infty$,1)-category $C$, can the fibrewise stabilization of it's codomain fibration, also called its tangent category $TC$, be given in terms of the Grothendieck construc …
3 votes
0 answers
133 views

Is there a construction capturing indexed families of adjunctions?

I'm sorry in advance if this question does not belong on this site. I am curious as to what is "really" going on when you have a family of functors indexed by elements in a base category, all of which …