Title :
Narrow Proofs May Be Maximally Long
Author :
Atserias, Albert ; Lauria, Massimo ; Nordstrom, Jakob
Author_Institution :
Univ. Politec. de Catalunya, Barcelona, Spain
Abstract :
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 bounds can be generalized 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-the formulas we study have Lasserre proofs of constant rank and size polynomial in both n and w.
Keywords :
computational complexity; theorem proving; 3-CNF formulas; Lasserre proofs; PCR; Sherali-Adams; constant rank; counting argument; lower bounds; narrow proofs; polynomial calculus resolution; resolution proofs; size polynomial; size upper bounds; Calculus; Complexity theory; Linear programming; Polynomials; Size measurement; Standards; Upper bound; Lasserre; PCR; Sherali-Adams; degree; length; polynomial calculus; proof complexity; rank; resolution; size; width;
Conference_Titel :
Computational Complexity (CCC), 2014 IEEE 29th Conference on
Conference_Location :
Vancouver, BC
DOI :
10.1109/CCC.2014.36
