category theory
category
functor
natural transformation
Cat
universal construction
representable functor
adjoint functor
limit/colimit
weighted limit
end/coend
Kan extension
Yoneda lemma
Isbell duality
Grothendieck construction
adjoint functor theorem
monadicity theorem
adjoint lifting theorem
Tannaka duality
Gabriel-Ulmer duality
small object argument
Freyd-Mitchell embedding theorem
relation between type theory and category theory
sheaf and topos theory
enriched category theory
higher category theory
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objects d∈Cd \in C such that C(d,−)C(d,-) commutes with certain colimits
coproduct-preserving representable
connected object
compact object
compact object in a (0,1)-category, compact object in an (∞,1)-category
finite object
small object
tiny object
atomic object
accessible category
compact topos
compact topological space
proper geometric morphism
proper map
A functor
is a κ\kappa-accessible functor (for κ\kappa a regular cardinal) if CC and DD are both κ\kappa-accessible categories and FF preserves κ\kappa-filtered colimits. FF is an accessible functor if it is κ\kappa-accessible for some regular cardinal κ\kappa.
accessible (∞,1)-functor.
accessible monad
The theory of accessible 1-categories is described in
The theory of accessible (∞,1)(\infty,1)-categories is the topic of section 5.4 of