English

Propositional Logics Complexity and the Sub-Formula Property

Logic in Computer Science 2015-04-13 v3

Abstract

In 1979 Richard Statman proved, using proof-theory, that the purely implicational fragment of Intuitionistic Logic (M-imply) is PSPACE-complete. He showed a polynomially bounded translation from full Intuitionistic Propositional Logic into its implicational fragment. By the PSPACE-completeness of S4, proved by Ladner, and the Goedel translation from S4 into Intuitionistic Logic, the PSPACE- completeness of M-imply is drawn. The sub-formula principle for a deductive system for a logic L states that whenever F1,...,Fk proves A, there is a proof in which each formula occurrence is either a sub-formula of A or of some of Fi. In this work we extend Statman result and show that any propositional (possibly modal) structural logic satisfying a particular formulation of the sub-formula principle is in PSPACE. If the logic includes the minimal purely implicational logic then it is PSPACE-complete. As a consequence, EXPTIME-complete propositional logics, such as PDL and the common-knowledge epistemic logic with at least 2 agents satisfy this particular sub-formula principle, if and only if, PSPACE=EXPTIME. We also show how our technique can be used to prove that any finitely many-valued logic has the set of its tautologies in PSPACE.

Keywords

Cite

@article{arxiv.1401.8209,
  title  = {Propositional Logics Complexity and the Sub-Formula Property},
  author = {Edward Hermann Haeusler},
  journal= {arXiv preprint arXiv:1401.8209},
  year   = {2015}
}

Comments

In Proceedings DCM 2014, arXiv:1504.01927

R2 v1 2026-06-22T02:58:41.048Z