论文信息 - Minimal Pairs and Complete Problems

Minimal Pairs and Complete Problems

Two sets are said to form a minimal pair for polynomial many-one reductions if neither set is in P and the only sets which are polynomially reducible (via polynomial many-one reductions) to both sets are in P. We consider the question of which complete sets can be the top (that is the supremum) of a minimal pair. Our main result is that any elementary recursive set which is hard for deterministic exponential time cannot be the top of a minimal pair. Hence in particular any complete set for an elementary recursive class containing exponential time cannot be such a supremum. For NP-complete sets the problem remains open. We show here that it is oracle dependent. This is the first example of an oracle dependent property which is completely degree theoretic.

Robert I. Soare | Klaus Ambos-Spies | Steven Homer

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