Universality of span 2-categories and the construction of 6-functor formalisms

Abstract

Given an ∞-category C equipped with suitable wide subcategories I, P ⊂ E⊂ C, we show that the (∞,2)-category S2(C,E)P,I of higher (or iterated) spans defined by Haugseng has the universal property that 2-functors S2(C,E)P,I D correspond precisely to (I, P)-biadjointable functors Cop D, i.e. functors F where F(i) for i ∈ I admits a left adjoint and F(p) for p ∈ P admits a right adjoint satisfying various Beck-Chevalley conditions. We also extend this universality to the symmetric monoidal and lax symmetric monoidal settings. This provides a conceptual explanation for - and an independent proof of - the Mann-Liu-Zheng construction of 6-functor formalisms from suitable functors Cop(Cat).