Timeline of category theory and related mathematics

1. Ross Street definition: A bicategory such that
2. small bicoproducts exist;
3. each monad admits a Kleisli construction (analogous to the quotient of an equivalence relation in a topos);
4. it is locally small-cocomplete; and
5. there exists a small Cauchy generator.

Cosmoses are closed under dualization, parametrization and localization. Ross Street also introduces elementary cosmoses.

Jean Bénabou definition: A bicomplete symmetric monoidal closed category

Def: A simplicial space X such that X₀ (the set of points) is a discrete simplicial set and the Segal map
φ_k : X_k → X₁ × _{X 0} ... × _{X 0}X₁ (induced by X(α_i):X_k → X₁) assigned to X is a weak equivalence of simplicial sets for k≥2.

Segal categories are a weak form of S-categories, in which composition is only defined up to a coherent system of equivalences.
Segal categories were defined one year later implicitly by Graeme Segal. They were named Segal categories first by William Dwyer–Daniel Kan–Jeffrey Smith 1989. In their famous book Homotopy invariant algebraic structures on topological spaces J. Michael Boardman and Rainer Vogt called them quasi-categories. A quasi-category is a simplicial set satisfying the weak Kan condition, so quasi-categories are also called weak Kan complexes

Def: A category C such that
1) for all X,Y in Ob(C) the Hom-sets Hom_C(X,Y) are finite-dimensional chain complexes of Z-graded modules
2) for all objects X₁,...,X_n in Ob(C) there is a family of linear composition maps (the higher compositions)
m_n : Hom_C(X₀,X₁) ⊗ Hom_C(X₁,X₂) ⊗ ... ⊗ Hom_C(X_n−1,X_n) → Hom_C(X₀,X_n) of degree n − 2 (homological grading convention is used) for n ≥ 1
3) m₁ is the differential on the chain complex Hom_C(X,Y)
4) m_n satisfy the quadratic A_∞-associativity equation for all n ≥ 0.

m₁ and m₂ will be chain maps but the compositions m_i of higher order are not chain maps; nevertheless they are Massey products. In particular it is a linear category.

Examples are the Fukaya category Fuk(X) and loop space ΩX where X is a topological space and A_∞-algebras as A_∞-categories with one object.

When there are no higher maps (trivial homotopies) C is a dg-category. Every A_∞-category is quasiisomorphic in a functorial way to a dg-category. A quasiisomorphism is a chain map that is an isomorphism in homology.

The framework of dg-categories and dg-functors is too narrow for many problems, and it is preferable to consider the wider class of A_∞-categories and A_∞-functors. Many features of A_∞-categories and A_∞-functors come from the fact that they form a symmetric closed multicategory, which is revealed in the language of comonads. From a higher-dimensional perspective A_∞-categories are weak ω-categories with all morphisms invertible. A_∞-categories can also be viewed as noncommutative formal dg-manifolds with a closed marked subscheme of objects.

The geometric Satake equivalence realized the category of representations of the Langlands dual group ^LG in terms of spherical perverse sheaves (or D-modules) on the affine Grassmannian Gr_G = G((t))/G[[t]] of the original group G.