completed this and other bibitems and brought them into chronological order

]]>Added a reference to Hirschhorn.

]]>Lurie’s Higher Algebra uses the opposite convention as Kerodon for final/initial functors. Added this to the list.

]]>I have now adjusted a little in the (merged) section *Terminology* (here).

Also added direct cross-links with the corresponding remark at *final functor*.

The section “Warning” overlaps with the material in the section “Terminology”. Since a warning should not be a section anyway, I have changed it from a section to a remark (and used the occasion to point to this remark from the first line of the idea section). But the overlap of material remains. Maybe somebody could streamline the section “Terminology” a little more.

]]>Changed “generalization” to “vertical categorification” in the idea section, to reflect the fact that final functors between (1,1)-categories need not be final (∞,1)-functors.

]]>Re #10: Is there any source other than Borceux that uses “final” to refer to the other notion?

]]>Added a new section (also in response to #10 above):

In most major references, “final map” is used to refer to (∞,1)-functors such that restriction along them preserves colimit cones and “initial map” is used for limit cones. A mnemonic rule for this terminology is that final objects are picked out by final functors and likewise for initial objects.

Lurie’s work is a notable exception to this rule.

Joyal’s The Theory of Quasi-Categories and its Applications: colimit-preserving:

*final*; limit-preserving:*initial*(page 171);Cisinski’s Higher Categories and Homotopical Algebra: colimit-preserving:

*final*(Definition 4.1.8); limit-preserving:*cofinal*(Definition 4.4.13);Riehl–Verity’s Elements of ∞-Category Theory: colimit-preserving:

*final*; limit-preserving:*initial*(Definition 2.4.5).Lurie’s Higher Topos Theory: limit-preserving: (no terminology introduced); colimit-preserving:

*cofinal*(Definition 4.1.1.1);Lurie’s Kerodon: limit-preserving:

*left cofinal*; colimit-preserving:*right cofinal*(Tag 02N1);

Re #6: I don’t think it’s great for the nlab to say that the term “cofinal” should be avoided when it’s by far the most common terminology in the literature on $\infty$-categories. What should definitely be avoided is using both “final” and “cofinal” as dual notions, but (with the unfortunate exception of Cisinski’s book, apparently) I believe the term “cofinal” unambiguously refers to colimits, while “final” has been used for both variants often enough that I think there’s a stronger argument for avoiding that word…

]]>Added the following paragraph about the new terminology introduced by Kerodon (as if the previous mess wasn’t enough):

In Kerodon, final (∞,1)-functors are referred to as *right cofinal functors*.
Likewise, initial (∞,1)-functors are known as *left cofinal functors*.

Remarked that a final functor between categories need not be final (∞,1)-functor. (but the converse is true)

]]>Remarked that a final functor between categories need not be final (∞,1)-functor. (but the converse is true)

]]>Added:

The term “cofinal (∞,1)-functor” can mean either a functor for which the precomposition functor preserves colimits (in Lurie’s Higher Topos Theory) or limits (in Cisinski’s Higher Categories and Homotopical Algebra.

Given that the two main sources for quasicategories assign opposite meanings to this term, it is best to avoid its usage altogether.

Further adding to the confusion is that some sources, like Borceux’s Handbook of Categorical Algebra use the term “final functor” for a functor for which the precomposition functor preserves limits, in contrast to the majority of the literature. Such usage, fortunately, is marginal.

]]>I have added an Example-section “Example: Cofiber products in coslice categories” (here). Currently it reads as follows:

Consider the inclusion of the walking span-category, into the result of adjoining an initial object $t$:

$\mathllap{ (1) \;\;\;\;\;\;\;\;\;\;\;\;\;\;\; } \Big\{ \array{ x &\longleftarrow& b &\longrightarrow& y } \Big\} \;\; \overset{\phantom{AAAA}}{\hookrightarrow} \;\; \left\{ \array{ && t \\ & \swarrow & \downarrow & \searrow \\ x &\longleftarrow& b &\longrightarrow& y } \right\}$One readily sees that for each object on the right, its comma category over this inclusion has contractible nerve, whence Theorem \ref{Recognition} implies that this inclusion is a final $\infty$-functor.

As an application of the finality of (1), observe that for $\mathcal{C}$ an (∞,1)-category and $T \in \mathcal{C}$ an object, (∞,1)-colimits in the under-(∞,1)-category

$\mathcal{C}^{T/} \overset{\;\;U\;\;}{\longrightarrow} \mathcal{C}$are given by the $\infty$-colimit in $\mathcal{C}$ itself of the given cone of the original diagram, with tip $X$ (by this Prop.): For

$F \;\colon\; \mathcal{I} \longrightarrow \mathcal{C}^{T/}$a small diagram, we have

$U \big( \underset{\longrightarrow}{\lim}\, F \big) \;\simeq\; \underset{\longrightarrow}{\lim}\, \big( T/U(F) \big)$(when either $\infty$-colimit exists).

Now for $\mathcal{I}$ the walking span diagram on the left of (1), this means that homotopy cofiber products in $\mathcal{C}^{T/}$ are computed as $\infty$-colimits in $\mathcal{C}$ of diagrams of the shape on the right of (1). But since the inclusion in (1) is final, these are just homotopy cofiber products in $\mathcal{C}$.

Explicitly: Given

$\array{ T &=& T &=& T \\ {}^{\mathllap{ \phi_X }} \big\downarrow && {}^{\mathllap{ \phi_B }} \big\downarrow && {}^{\mathllap{ \phi_Y }} \big\downarrow \\ X & \underset{ f }{\longleftarrow} & B & \underset{ g }{ \longrightarrow } & Y }$regarded as a span in $\mathcal{C}^T$, hence with underlying objects

$U\big( (X,\phi_X) \big) \;=\; X \,, \;\;\;\;\;\; U\big( (B,\phi_B) \big) \;=\; B \,, \;\;\;\;\;\; U\big( (Y,\phi_Y) \big) \;=\; Y \,,$we have:

$U \Big( \; (X,\phi_X) \underset{ (B,\phi_B) }{\coprod} (Y,\phi_Y) \; \Big) \;\;\;\simeq\;\;\; X \underset{B}{\coprod} Y \,.$In particular, if $(B,\phi_B) \;\coloneqq\; (T,id_T)$ is the initial object in $\mathcal{C}^{T/}$, in which case the cofiber product is just the coproduct

$(X,\phi_X) \coprod (Y,\phi_Y) \;\;=\;\; (X,\phi_X) \underset{ (T,id_T) }{\coprod} (Y,\phi_Y)$we find that the coproduct in the co-slice category is the co-fiber product under the given tip object in the underlying category

$U \Big( \; (X,\phi_X) \coprod (Y,\phi_Y) \; \Big) \;\;\;\simeq\;\;\; X \underset{T}{\coprod} Y \,.$]]>

Added the fact that (weak) localizations are initial and final, together with the fact that the initial vertex map from the category of simplices is a weak localization (and hence initial and final). Added references to Shah and Cisinski about this and noted that this can be used to prove a Bousfield-Kan formula for homotopy (co)limits in infinity categories. Hopefully didn’t screw up the whole page- I’m horrible at html/computers in general…

Dylan

]]>exibits -> exhibits

Ian Coley

]]>made the reference-link work, by adding the missing anchor

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#Hovey
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I corrected a couple of wrong claims and added the link to a counter-example

AG

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