Go to DBLP homepageMany-Valued Logics and Holographic Proofs
Abstract: We reformulate the subject of holographic proof checking in terms of three-valued logic. In this reformulation the recursive proof checking idea of Arora and Safra gets an especially elegant form. Our approach gives a more concise and accurate treatment of the holographic proof theory, and yields easy to check proofs about holographic proofs. A consequence of our results is that for any ∈ > 0 MAX3SAT instances cannot be approximated in TIME(2n1-∈ ) within a factor which tends to 1 when n tends to infinity, unless 3SAT can be solved in TIME(2n1-∈) for some ∈ > 0.
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