English

On Probabilistic $\omega$-Pushdown Systems, and $\omega$-Probabilistic Computational Tree Logic

Logic in Computer Science 2026-04-03 v18 Formal Languages and Automata Theory Quantum Physics

Abstract

In this paper, we define the notion of {\em probabilistic ω\omega-pushdown automaton} and study its model-checking problem against the logic of ω\omega-probabilistic computational tree logic (ω\omega-PCTL) and its bounded version from a computational complexity view. Specifically, we obtain the following equally important new results: (1) We define {\em probabilistic ω\omega-pushdown automaton} for the first time and study the model-checking question of {\em stateless probabilistic ω\omega-pushdown system (ω\omega-pBPA)} against ω\omega-PCTL (defined by Chatterjee, Sen, and Henzinger in \cite{CSH08}), showing that model-checking of {\em stateless probabilistic ω\omega-pushdown systems (ω\omega-pBPA)} against ω\omega-PCTL is generally undecidable. Our approach is to construct ω\omega-PCTL formulas encoding the {\em Post Correspondence Problem}. (2) We then study in which case there exists an algorithm for model-checking {\it stateless probabilistic ω\omega-pushdown systems} and show that the problem of model-checking {\it stateless probabilistic ω\omega-pushdown systems} against ω\omega-{\it bounded probabilistic computational tree logic} (ω\omega-bPCTL) is decidable, and further show that this problem is NP\mathit{NP}-hard.

Keywords

Cite

@article{arxiv.2209.10517,
  title  = {On Probabilistic $\omega$-Pushdown Systems, and $\omega$-Probabilistic Computational Tree Logic},
  author = {Deren Lin and Tianrong Lin},
  journal= {arXiv preprint arXiv:2209.10517},
  year   = {2026}
}

Comments

[v18] Definition 3.5 has been revised more simply and directly (with main conclusions unchanged). arXiv admin note: text overlap with arXiv:1405.4806

R2 v1 2026-06-28T01:50:17.861Z