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Complexity of Null- and Positivstellensatz proofs
Annals of Pure and Applied Logic 113 (1-3):153-160 (2001)
Abstract
We introduce two versions of proof systems dealing with systems of inequalities: Positivstellensatz refutations and Positivstellensatz calculus. For both systems we prove the lower bounds on degrees and lengths of derivations for the example due to Lazard, Mora and Philippon. These bounds are sharp, as well as they are for the Nullstellensatz refutations and for the polynomial calculus. The bounds demonstrate a gap between the Null- and Positivstellensatz refutations on one hand, and the polynomial calculus and Positivstellensatz calculus on the otherOther Versions
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Citations of this work
First-order reasoning and efficient semi-algebraic proofs.Fedor Part, Neil Thapen & Iddo Tzameret - 2025 - Annals of Pure and Applied Logic 176 (1):103496.
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