The ∞-category of ∞-categories in simplicial type theory

Abstract

Simplicial type theory (STT) was introduced by Riehl and Shulman to leverage homotopy type theory to prove results about (∞,1)-categories. Initial work on simplicial type theory focused on "formal" arguments in higher category theory and, in particular, no non-trivial examples of ∞-category theory were constructible within STT. More recent work has changed this state of affairs by applying techniques developed initial for cubical type theory to construct the ∞-category of spaces. We complete this process by constructing the ∞-category of ∞-categories, recovering one of the main foundational results of ∞-category theory (straightening--unstraightening) purely type-theoretically. We also show how this construction enables new examples of the directed version of the structure identity principle, the structure homomorphism principle.