On Elementary Theories of Ordinal Notation Systems based on Reflection Principles

Abstract

We consider the constructive ordinal notation system for the ordinal ε0 that were introduced by L.D. Beklemishev. There are fragments of this system that are ordinal notation systems for the smaller ordinals ωn (towers of ω-exponentiations of the height n). This systems are based on Japaridze's provability logic GLP. They are closely related with the technique of ordinal analysis of PA and fragments of PA based on iterated reflection principles. We consider this notation system and it's fragments as structures with the signatures selected in a natural way. We prove that the full notation system and it's fragments, for ordinals ω4, have undecidable elementary theories. We also prove that the fragments of the full system, for ordinals ω3, have decidable elementary theories. We obtain some results about decidability of elementary theory, for the ordinal notation systems with weaker signatures.