Induction on Dilators and Bachmann-Howard Fixed Points
Abstract
One of the most important principles of J.-Y. Girard's 12-logic is induction on dilators. In particular, Girard used this principle to construct his famous functor . He claimed that the totality of is equivalent to the set existence axiom of 11-comprehension from reverse mathematics. While Girard provided a plausible description of a proof around 1980, it seems that the very technical details have not been worked out to this day. A few years ago, a loosely related approach led to an equivalence between 11-comprehension and a certain Bachmann-Howard principle. The present paper closes the circle. We relate the Bachmann-Howard principle to induction on dilators. This allows us to show that 11-comprehension is equivalent to the totality of a functor J due to P. P\"appinghaus, which can be seen as a streamlined version of .
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