Separation of bounded arithmetic using a consistency statement

Abstract

This paper proves Buss's hierarchy of bounded arithmetics S12 ⊂eq S22 ⊂eq ·s ⊂eq Si2 ⊂eq ·s does not entirely collapse. More precisely, we prove that, for a certain D, S12 ⊂neq S2D+52 holds. Further, we can allow any finite set of true quantifier free formulas for the BASIC axioms of S12, S22, …. By Takeuti's argument, this implies P ≠ NP. Let Ax be a certain formulation of BASIC axioms. We prove that S12 Con(PV-1(D) + Ax) for sufficiently large D, while S2D+72 Con(PV-1(D) + Ax) for a system PV-1(D), a fragment of the system PV-1, induction free first order extension of Cook's PV, of which proofs contain only formulas with less than D connectives. S12 Con(PV-1(D) + Ax) is proved by straightforward adaption of the proof of PV Con(PV-) by Buss and Ignjatovi\'c. S2D+52 Con(PV-1(D) + Ax) is proved by S2D+72 Con(PV-q(D+2) + Ax), where PV-q is a quantifier-only extension of PV-. The later statement is proved by an extension of a technique used for Yamagata's proof of S22 Con(PV-), in which a kind of satisfaction relation Sat is defined. By extending Sat to formulas with less than D-quantifiers, S2D+32 Con(PV-q(D) + Ax) is obtained in a straightforward way.