(2,1)-quasitopos?
structures in a cohesive (∞,1)-topos
Higher topos theory is the generalisation to higher category theory of topos theory. It is partly motivated by Grothendieck‘s program in Pursuing Stacks.
More generally, the concept -topos is to topos as (n,r)-category is to category.
Rather little is known about the very general notion of higher topos theory. A rich theory however exists in the context of (∞,1)-categories, see at (∞,1)-topos theory
flavors of higher toposes
Just as the archetypical example of an ordinary topos (i.e. a (1,1)-topos) is Set – the category of 0-categories – so the -category of (n,r)-categories should form the archetypical example of an -topos:
(examples of archetypical higher toposes)
Grpd– the (2,1)-category of groupoids, hence of (1,0)-categories – should be the archetypical (2,1)-topos.
Cat– the 2-category of categories, hence of (1,1)-categories – should be the archetypical 2-topos (i.e. (2,2)-topos).
Pos– the category of posets and monotone maps, hence of (0,1)-categories – should be the archetypal (1,2)-topos.
∞Grpd– the (∞,1)-category of ∞-groupoids, hence of (∞,0)-categories – is the archetypical (∞,1)-topos;
(∞,1)Cat– the (∞,2)-category of (∞,1)-categories – should be the archetypical (∞,2)-topos.
Last revised on August 25, 2021 at 15:38:24. See the history of this page for a list of all contributions to it.