Propositional proof systems and fast consistency provers
Publication date
2006-08
Authors
Joosten, J.J.
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Document Type
Preprint
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Abstract
A fast consistency prover is a consistent poly-time axiomatized theory
that has short proofs of the finite consistency statements of any other
poly-time axiomatized theory. Krajícek and Pudlák proved in [5] that
the existence of an optimal propositional proof system is equivalent to
the existence of a fast consistency prover. It is an easy observation that
NP = coNP implies the existence of a fast consistency prover. The reverse
implication is an open question.
In this paper we define the notion of an unlikely fast consistency prover
and prove that its existence is equivalent to NP = coNP.
Next it is proved that fast consistency provers do not exist if one
considers RE axiomatized theories rather than theories with an axiom set
that is recognizable in polynomial time.