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STACS
2010
Springer

On Optimal Heuristic Randomized Semidecision Procedures, with Application to Proof Complexity

14 years 7 months ago
On Optimal Heuristic Randomized Semidecision Procedures, with Application to Proof Complexity
The existence of a (p-)optimal propositional proof system is a major open question in (proof) complexity; many people conjecture that such systems do not exist. Kraj´ıˇcek and Pudl´ak [KP89] show that this question is equivalent to the existence of an algorithm that is optimal1 on all propositional tautologies. Monroe [Mon09] recently gave a conjecture implying that such algorithm does not exist. We show that in the presence of errors such optimal algorithms do exist. The concept is motivated by the notion of heuristic algorithms. Namely, we allow the algorithm to claim a small number of false “theorems” (according to any polynomial-time samplable distribution on non-tautologies) and err with bounded probability on other inputs. Our result can also be viewed as the existence of an optimal proof system in a class of proof systems obtained by generalizing automatizable proof systems.
Edward A. Hirsch, Dmitry Itsykson
Added 14 May 2010
Updated 14 May 2010
Type Conference
Year 2010
Where STACS
Authors Edward A. Hirsch, Dmitry Itsykson
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