Predicative proof theory of PDL and basic applications
Abstract
Propositional dynamic logic (PDL) is presented in Sch\"{u}tte-style mode as one-sided semiformal tree-like sequent calculus Seq with standard cut rule and the omega-rule with principal formulas . The omega-rule-free derivations in Seq are finite (trees) and sequents deducible by these finite derivations are valid in PDL. Moreover the cut-elimination theorem for Seq is provable in Peano Arithmetic (PA)extended by transfinite induction up to Veblen's ordinal . Hence (by the cutfree subformula property) such predicative extension of PA proves that any given -free sequent is valid in PDL iff it is deducible in Seq by a finite cut- and omega-rule-free derivation, while PDL-validity of arbitrary star-free sequents is decidable in polynomial space. The former also implies standard Herbrand-style conclusions, which eventually leads to PSPACE-decidability of PDL-validity of , provided that is atomic and is in a suitable \emph{basic conjunctive normal form}. Furthermore we consider star-free formulas in dual \emph{basic disjunctive normal form}, and corresponding expansions whose PDL-validity problem is known to be EXPTIME-complete. We show that cutfree-derivability in Seq (hence PDL-validity) of such \ is equivalent to plain validity of a suitable "transparent" quantified boolean formula . The whole proof can be formalized in PA extended by transfinite induction along -- actually in the corresponding primitive recursive weakening, .
Keywords
Cite
@article{arxiv.1904.05131,
title = {Predicative proof theory of PDL and basic applications},
author = {Lev Gordeev},
journal= {arXiv preprint arXiv:1904.05131},
year = {2021}
}
Comments
28 pages (incl. 2 appendices), talk at workshop Proods and Computations 2018, HIM (Bonn)