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We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w but require resolution proofs of size nΩ(w). This shows that the simple counting argument that any formula refutable in width w must have a proof in size nO(w) is essentially tight. Moreover, our lower bound generalizes to polynomial calculus resolution (PCR) and Sherali-Adams, implying that the corresponding size upper bounds in terms of degree and rank are tight as well. Our results do not extend all the way to Lasserre, however, where the formulas we study have proofs of constant rank and size polynomial in both n and w.
We introduce an algebraic proof system Pcrk, which combines together Polynomial Calculus (Pc) and k-...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width ...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
We give simple new lower bounds on the lengths of Resolution proofs for the pigeonhole principle and...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
Building on [Clegg et al.’96], [Impagliazzo et al.’99] established that if an unsatisfiable k-CNF fo...
We introduce an algebraic proof system Pcrk, which combines together Polynomial Calculus (Pc) and k-...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width ...
We prove that there are 3-CNF formulas over n variables that can be refuted in resolution in width w...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
We give simple new lower bounds on the lengths of Resolution proofs for the pigeonhole principle and...
In 2003, Atserias and Dalmau resolved a major open question about the resolution proof system by est...
Building on [Clegg et al.’96], [Impagliazzo et al.’99] established that if an unsatisfiable k-CNF fo...
We introduce an algebraic proof system Pcrk, which combines together Polynomial Calculus (Pc) and k-...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
There are unsatisfiable $k$-CNF formulas in n variables such that each regular resolution refutation...
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