المفاهيم الأساسية
Homotopy type theory serves as an internal language for diagrams of ∞-logoses, enabling reasoning about higher-dimensional logical relations.
الإحصائيات
"An ∞-logos is a place for homotopy theory like an ordinary logos for set-level mathematics."
"Homotopy type theory extends Martin-Löf type theory with the univalence axiom and higher inductive types."
"Shulman has shown that any ∞-logos can be interpreted using homotopy type theory as an internal language."
اقتباسات
"Homotopy type theory is an internal language of an ∞-logos."
"Mode sketches provide an alternative synthetic method of constructing logical relations."
"Oplax limits of diagrams classify oplax natural transformations and generalize the Artin gluing."