Background
Basic concepts
equivalences in/of -categories
Universal constructions
Local presentation
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Extra stuff, structure, properties
Models
This is the analog of a filtered category in the context of (∞,1)-categories.
The main purpose of considering filtered (∞,1)-categories is to define filtered (∞,1)-colimits, which are the colimits that commute with finite (∞,1)-limits.
Let be a regular cardinal, and let be an (∞,1)-category, incarnated as a quasicategory.
is called -filtered if for all -small and every morphism there is a morphism extending , where denotes the (right) cone of the simplicial set . is called filtered if it is -filtered.
An (∞,1)-category is filtered precisely if (∞,1)-colimits of shape in ∞Grpd commute with all finite (∞,1)-limits, hence if
is a left exact (∞,1)-functor.
This is HTT, prop. 5.3.3.3.
A filtered -category is in particular a sifted (∞,1)-category.
This appears as (Lurie, prop. 5.3.1.20). Since sifted (∞,1)-colimits are precisely those that commute with finite products, this is a direct reflection of the fact that finite products are a special kind of finite (∞,1)-limits.
For a filtered -category, the diagonal (∞,1)-functor if a cofinal (∞,1)-functor.
A filtered -category is weakly contractible, i.e. when incarnated as a quasicategory, it is weakly equivalent to a point in the Kan-Quillen model structure on simplicial sets.
This is (Lurie, Lemma 5.3.1.18).
sifted category, sifted colimit, sifted (∞,1)-category, sifted (∞,1)-colimit
directed set, filtered category, filtered (∞,1)-category
Section 5.3.1 of
Last revised on March 18, 2024 at 22:12:01. See the history of this page for a list of all contributions to it.