We show that the problem of finding a Resolution refutation that is at most polynomially longer than a shortest one is NP-hard. In the parlance of proof complexity, Resolution is not automatizable unless P = NP. Indeed, we show that it is NP-hard to distinguish between formulas that have Resolution refutations of polynomial length and those that do not have subexponential length refutations. This also implies that Resolution is not automatizable in subexponential time or quasi-polynomial time unless~NP is included in SUBEXP or QP, respectively.Peer ReviewedPostprint (author's final draft
We study the random resolution refutation system definedin [Buss et al. 2014]. This attempts to cap...
AbstractThe resolution tree problem consists of deciding whether a given sequence-like resolution re...
AbstractResolution and cut-free LK are the most popular propositional systems used for logical autom...
We show that the problem of finding a Resolution refutation that is at most polynomially longer than...
We show that it is NP-hard to distinguish formulas that have Resolution refutations of almost linear...
AbstractA propositional proof system is automatizable if there is an algorithm that, given a tautolo...
A propositional proof system is automatizable if there is an algorithm that, given a tautology, pro...
For any unsatisfiable CNF formula we give an exponential lower bound on the size of resolutionrefuta...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
A propositional proof system R is called automatizable if there is an algorithm that produces for ev...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
We obtain a streamlined proof of an important result by Alekhnovich and Razborov [Michael Alekhnovic...
AbstractWe prove that, for infinitely many disjunctive normal form propositional calculus tautologie...
AbstractThe basis of this paper is the observation that for several proof systems for propositional ...
We explore the relationships between the computational problem of recognizing expander graphs, and t...
We study the random resolution refutation system definedin [Buss et al. 2014]. This attempts to cap...
AbstractThe resolution tree problem consists of deciding whether a given sequence-like resolution re...
AbstractResolution and cut-free LK are the most popular propositional systems used for logical autom...
We show that the problem of finding a Resolution refutation that is at most polynomially longer than...
We show that it is NP-hard to distinguish formulas that have Resolution refutations of almost linear...
AbstractA propositional proof system is automatizable if there is an algorithm that, given a tautolo...
A propositional proof system is automatizable if there is an algorithm that, given a tautology, pro...
For any unsatisfiable CNF formula we give an exponential lower bound on the size of resolutionrefuta...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
A propositional proof system R is called automatizable if there is an algorithm that produces for ev...
We show that algebraic proofs are hard to find: Given an unsatisfiable CNF formula F, it is NP-hard ...
We obtain a streamlined proof of an important result by Alekhnovich and Razborov [Michael Alekhnovic...
AbstractWe prove that, for infinitely many disjunctive normal form propositional calculus tautologie...
AbstractThe basis of this paper is the observation that for several proof systems for propositional ...
We explore the relationships between the computational problem of recognizing expander graphs, and t...
We study the random resolution refutation system definedin [Buss et al. 2014]. This attempts to cap...
AbstractThe resolution tree problem consists of deciding whether a given sequence-like resolution re...
AbstractResolution and cut-free LK are the most popular propositional systems used for logical autom...