论文信息 - The Intractability of Resolution

The Intractability of Resolution

Abstract We prove that, for infinitely many disjunctive normal form propositional calculus tautologies ξ, the length of the shortest resolution proof of ξ cannot be bounded by any polynomial of the length of ξ. The tautologies we use were introduced by Cook and Reckhow (1979) and encode the pigeonhole principle. Extended resolution can furnish polynomial length proofs of these formulas.

Armin Haken | Armin Haken

[1] J. A. Robinson,et al. A Machine-Oriented Logic Based on the Resolution Principle , 1965, JACM.

[2] Stephen A. Cook,et al. The Relative Efficiency of Propositional Proof Systems , 1979, Journal of Symbolic Logic.

[3] Stephen Cook,et al. Corrections for "On the lengths of proofs in the propositional calculus preliminary version" , 1974, SIGA.

[4] Hilary Putnam,et al. A Computing Procedure for Quantification Theory , 1960, JACM.

[5] Zvi Galil,et al. On the Complexity of Regular Resolution and the Davis-Putnam Procedure , 1977, Theor. Comput. Sci..

[6] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .