Effective Disjunction and Effective Interpolation in Suffciently Strong Proof Systems

Abstract

In this article, we deal with the uniform effective disjunction property and the uniform effective interpolation property, which are weaker versions of the classical effective disjunction property and the effective interpolation property.\\ The main result of the paper is as follows: Suppose the proof system EF (Extended Frege) has the uniform effective disjunction property, then every sufficiently strong proof system S that corresponds to a theory T, which is a theory in the same language as the theory V11, also has the uniform effective disjunction property. Furthermore, if we assume that EF has the uniform effective interpolation property, then the proof system S also has the uniform effective interpolation property.\\ From this, it easily follows that if EF has the uniform effective interpolation property, then for every disjoint NE-pair, there exists a set in E that separates this pair. Thus, if EF has the uniform effective interpolation property, it specifically holds that NE coNE = E. Additionally, at the end of the article, the following is proven: Suppose the proof system EF has the uniform effective interpolation property, and let A1 and A2 be a (not necessarily disjoint) NE-pair such that A1 A2 = N; then there exists an exponential time algorithm which for every input n (of length O( n)) finds i∈\1,2\ such that n∈ Ai.