Epistemic systems and Flagg and Friedman's translation

Abstract

In 1986, Flagg and Friedman ff gave an elegant alternative proof of the faithfulness of G\"odel (or Rasiowa-Sikorski) translation (·) of Heyting arithmetic HA to Shapiro's epistemic arithmetic EA. In 2, we shall prove the faithfulness of (·) without using stability, by introducing another translation from an epistemic system to corresponding intuitionistic system which we shall call the modified Rasiowa-Sikorski translation . That is, this introduction of the new translation simplifies the original Flagg and Friedman's proof. In 3, we shall give some applications of the modified one for the disjunction property (DP) and the numerical existence property (NEP) of Heyting arithmetic. In 4, we shall show that epistemic Markov's rule EMR in EA is proved via HA. So EA EMR and HA MR are equivalent. In 5, we shall give some relations among the translations treated in the previous sections. In 6, we shall give an alternative proof of Glivenko's theorem. In 7, we shall propose several(modal-)epistemic versions of Markov's rule for Horsten's modal-epistemic arithmetic MEA. And, as in 4, we shall study some meta-implications among those versions of Markov's rules in MEA and one in HA. Friedman and Sheard gave a modal analogue FS (i.e. Theorem in fs) of Friedman's theorem F (i.e. Theorem 1 in friedman): Any recursively enumerable extension of HA which has DP also has NPE . In 8, we shall give a proof of our Fundamental Conjecture FC proposed in Inou\'e ino90a as follows: FC: FS F. This is a new type of proofs. In 9, I shall give discussions.