English

Characterizing Tseitin-formulas with short regular resolution refutations

Computational Complexity 2021-03-18 v1

Abstract

Tseitin-formulas are systems of parity constraints whose structure is described by a graph. These formulas have been studied extensively in proof complexity as hard instances in many proof systems. In this paper, we prove that a class of unsatisfiable Tseitin-formulas of bounded degree has regular resolution refutations of polynomial length if and only if the treewidth of all underlying graphs GG for that class is in O(logV(G))O(\log|V(G)|). To do so, we show that any regular resolution refutation of an unsatisfiable Tseitin-formula with graph GG of bounded degree has length 2Ω(tw(G))/V(G)2^{\Omega(tw(G))}/|V(G)|, thus essentially matching the known 2O(tw(G))poly(V(G))2^{O(tw(G))}poly(|V(G)|) upper bound up. Our proof first connects the length of regular resolution refutations of unsatisfiable Tseitin-formulas to the size of representations of \textit{satisfiable} Tseitin-formulas in decomposable negation normal form (DNNF). Then we prove that for every graph GG of bounded degree, every DNNF-representation of every satisfiable Tseitin-formula with graph GG must have size 2Ω(tw(G))2^{\Omega(tw(G))} which yields our lower bound for regular resolution.

Keywords

Cite

@article{arxiv.2103.09609,
  title  = {Characterizing Tseitin-formulas with short regular resolution refutations},
  author = {Alexis de Colnet and Stefan Mengel},
  journal= {arXiv preprint arXiv:2103.09609},
  year   = {2021}
}

Comments

20 pages including references

R2 v1 2026-06-24T00:16:20.356Z