English

QRAT Polynomially Simulates Merge Resolution

Computational Complexity 2021-07-27 v1 Logic in Computer Science

Abstract

Merge Resolution (MRes [Beyersdorff et al. J. Autom. Reason.'2021] ) is a refutational proof system for quantified Boolean formulas (QBF). Each line of MRes consists of clauses with only existential literals, together with information of countermodels stored as merge maps. As a result, MRes has strategy extraction by design. The QRAT [Heule et al. J. Autom. Reason.'2017] proof system was designed to capture QBF preprocessing. QRAT can simulate both the expansion-based proof system \forallExp+Res and CDCL-based QBF proof system LD-Q-Res. A family of false QBFs called SquaredEquality formulas were introduced in [Beyersdorff et al. J. Autom. Reason.'2021] and shown to be easy for MRes but need exponential size proofs in Q-Res, QU-Res, CP+\forallred, \forallExp+Res, IR-calc and reductionless LD-Q-Res. As a result none of these systems can simulate MRes. In this paper, we show a short QRAT refutation of the SquaredEquality formulas. We further show that QRAT strictly p-simulates MRes. Besides highlighting the power of QRAT system, this work also presents the first simulation result for MRes.

Cite

@article{arxiv.2107.09320,
  title  = {QRAT Polynomially Simulates Merge Resolution},
  author = {Sravanthi Chede and Anil Shukla},
  journal= {arXiv preprint arXiv:2107.09320},
  year   = {2021}
}

Comments

12 pages, 1 figure

R2 v1 2026-06-24T04:21:09.072Z