Thursday 30 March 2017, 14:00: An interpretation of system F through bar recursion, Valentin Blot (Queen Mary University of London).
There are two possible computational interpretations of second-order arithmetic: Girard's system F and Spector's bar recursion. While the logic is the same, the programs obtained from these two interpretations have a fundamentally different computational behavior and their relationship is not well understood. We make a step towards a comparison by defining the first translation of system F into a simply-typed total language with bar recursion. This translation relies on a realizability interpretation of second-order arithmetic. Due to Godel's incompleteness theorem there is no proof of termination of system F within second-order arithmetic. However, for each individual term of system F there is a proof in second-order arithmetic that it terminates, with its realizability interpretation providing a bound on the number of reduction steps to reach a normal form. Using this bound, we compute the normal form through primitive recursion. Moreover, since the normalization proof of system F proceeds by induction on typing derivations, the translation is compositional. The flexibility of our method opens the possibility of getting a more direct translation that will provide an alternative approach to the study of polymorphism, namely through bar recursion.