Short Proofs for Slow Consistency

Abstract

Let Con( T)\!\!x denote the finite consistency statement "there are no proofs of contradiction in T with ≤ x symbols". For a large class of natural theories T, Pudl\'ak has shown that the lengths of the shortest proofs of Con( T)\!\!n in the theory T itself are bounded by a polynomial in n. At the same time he conjectures that T does not have polynomial proofs of the finite consistency statements Con( T+Con( T))\!\!n. In contrast we show that Peano arithmetic (PA) has polynomial proofs of Con(PA+Con*(PA))\!\!n, where Con*(PA) is the slow consistency statement for Peano arithmetic, introduced by S.-D. Friedman, Rathjen and Weiermann. We also obtain a new proof of the result that the usual consistency statement Con(PA) is equivalent to 0 iterations of slow consistency. Our argument is proof-theoretic, while previous investigations of slow consistency relied on non-standard models of arithmetic.