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Better Extension Variables in DQBF via Independence

Authors Leroy Chew , Tomáš Peitl

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ACM Subject Classification
  • Theory of computation → Proof complexity
Keywords
  • DQBF
  • QBF
  • Proof Systems
  • Dependency Schemes
  • RAT
  • Extended Frege
  • Skolem functions

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Abstract

We show that extension variables in (D)QBF can be generalised by conditioning on universal assignments. The benefit of this is that the dependency sets of such conditioned extension variables can be made smaller to allow easier refutations. This simple modification instantly solves many challenges in p-simulating the QBF expansion rule, which cannot be p-simulated in proof systems that have strategy extraction [Leroy Chew and Judith Clymo, 2020]. Simulating expansion is even more crucial in DQBF, where other methods are incomplete. In this paper we provide an overview of the strength of this new independent extension rule. We find that a new version of Extended Frege called IndExtFrege + ∀red can p-simulate a multitude of difficult QBF and DQBF techniques, even techniques that are difficult to approach with eFrege + ∀red. We show five p-simulations, that IndExtFrege + ∀red p-simulates QRAT, DQBF-IR-calc, IR(𝒟^rrs)-calc, Fork-Resolution and DQRAT which together underpin most DQBF solving and preprocessing techniques. The p-simulations work despite these systems using complicated rules and our new extension rule being relatively simple. Moreover, unlike recent p-simulations by eFrege + ∀red we can simulate the proof rules line by line, which allows us to mix QBF rules more easily with other inference steps.

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Leroy Chew and Tomáš Peitl. Better Extension Variables in DQBF via Independence. In 28th International Conference on Theory and Applications of Satisfiability Testing (SAT 2025). Leibniz International Proceedings in Informatics (LIPIcs), Volume 341, pp. 11:1-11:24, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2025) https://doi.org/10.4230/LIPIcs.SAT.2025.11

Author Details

Leroy Chew
  • TU Wien, Austria
Tomáš Peitl
  • TU Wien, Austria

Funding

  • Chew, Leroy: Funding by FWF ESPRIT grant number ESP-197.

Acknowledgements

Thanks to Marijn Heule and Mikoláš Janota for their discussions on this topic. Thanks to the anonymous reviewers for the valuable feedback.

References

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