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COCO
2001
Springer
2001
Springer
In Search of an Easy Witness: Exponential Time vs. Probabilistic Polynomial Time
Restricting the search space {0, 1}n to the set of truth tables of “easy” Boolean functions on log n variables, as well as using some known hardness-randomness tradeoffs, we establish a number of results relating the complexity of exponential-time and probabilistic polynomialtime complexity classes. In particular, we show that NEXP ⊂ P/poly ⇔ NEXP = MA; this can be interpreted as saying that no derandomization of MA (and, hence, of promise-BPP) is possible unless NEXP contains a hard Boolean function. We also prove several downward closure results for ZPP, RP, BPP, and MA; e.g., we show EXP = BPP ⇔ EE = BPE, where EE is the double-exponential time class and BPE is the exponential-time analogue of BPP.
Real-time TrafficAlgorithms | Boolean Function | COCO 2001 | Hard Boolean Function | Probabilistic Polynomialtime Complexity |
| Added | 28 Jul 2010 |
| Updated | 28 Jul 2010 |
| Type | Conference |
| Year | 2001 |
| Where | COCO |
| Authors | Russell Impagliazzo, Valentine Kabanets, Avi Wigderson |
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