On the conservation results for local reflection principles

Abstract

For a class of formulas, local reflection principle Rfn(T) for a theory T of arithmetic is a scheme formalizing the -soundness of T. Beklemishev proved that for every ∈ \n, n+1 n ≥ 1\, the full local reflection principle Rfn(T) is -conservative over T + Rfn(T). We firstly generalize the conservation theorem to nonstandard provability predicates: we prove that the second condition D2 of the derivability conditions is a sufficient condition for the conservation theorem to hold. We secondly investigate the conservation theorem in terms of Rosser provability predicates. We construct Rosser predicates for which the conservation theorem holds and Rosser predicates for which the theorem does not hold.