We introduce a generalization of Selman s P-selectivity that yields a more flexible notion of selectivity, called (polynomial-time) multi-selectivity, in which the selector is allowed to operate on multiple input strings. Since our introduction of this class, it has been used [HJRW] to prove the first known (and optimal) lower bounds for generalized selectivity-like classes in terms of EL2 , the second level of the extended low hierarchy. We study the resulting selectivity hierarchy, denoted by SH, which we prove does not collapse. In particular, we study the internal structure and the properties of SH and completely establish, in terms of incomparability and strict inclusion, the relations between our generalized selectivity classes and Og...
] Ashish V. Naik Alan L. Selman y December 19, 1995 Abstract We study two properties of a compl...
AbstractWe prove that the join of two sets may actually fall into a lower level of the extended low ...
We identify two properties that for P-selective sets are effectively computable. Namely we show that...
A set is P-selective if there is a polynomial-time semi-decision algorithm for the set---an algorith...
A set is P-selective if there is a polynomial-time semi-decision algorithm for the set---an algorith...
AbstractA set is P-selective (Selman, 1979) if there is a polynomial-time semidecision algorithm for...
We study the polynomial-time semi-rankable sets (P-sr), the ranking analog of the P-selective sets. ...
Is there a single-valued NP function that, when given a satisfiable formula as input, outputs a sati...
Hemaspaandra and Torenvliet showed that each P-selective set can be accepted by a polynomial-time no...
The nondeterministic advice complexity of the P-selective sets is known to be exactly linear. Regard...
The nondeterministic advice complexity of the P-selective sets is known to be exactly linear. Regard...
The P-selective sets are those sets for which there is a polynomial-time algorithm that, given any t...
We study two properties of a complexity class —whether there exists a truthtable hard p-selective la...
We consider sets Turing reducible to p-selective sets under various resource bounds and restricted n...
P/poly, the class of sets with polynomial size circuits, has been the subject of considerable study ...
] Ashish V. Naik Alan L. Selman y December 19, 1995 Abstract We study two properties of a compl...
AbstractWe prove that the join of two sets may actually fall into a lower level of the extended low ...
We identify two properties that for P-selective sets are effectively computable. Namely we show that...
A set is P-selective if there is a polynomial-time semi-decision algorithm for the set---an algorith...
A set is P-selective if there is a polynomial-time semi-decision algorithm for the set---an algorith...
AbstractA set is P-selective (Selman, 1979) if there is a polynomial-time semidecision algorithm for...
We study the polynomial-time semi-rankable sets (P-sr), the ranking analog of the P-selective sets. ...
Is there a single-valued NP function that, when given a satisfiable formula as input, outputs a sati...
Hemaspaandra and Torenvliet showed that each P-selective set can be accepted by a polynomial-time no...
The nondeterministic advice complexity of the P-selective sets is known to be exactly linear. Regard...
The nondeterministic advice complexity of the P-selective sets is known to be exactly linear. Regard...
The P-selective sets are those sets for which there is a polynomial-time algorithm that, given any t...
We study two properties of a complexity class —whether there exists a truthtable hard p-selective la...
We consider sets Turing reducible to p-selective sets under various resource bounds and restricted n...
P/poly, the class of sets with polynomial size circuits, has been the subject of considerable study ...
] Ashish V. Naik Alan L. Selman y December 19, 1995 Abstract We study two properties of a compl...
AbstractWe prove that the join of two sets may actually fall into a lower level of the extended low ...
We identify two properties that for P-selective sets are effectively computable. Namely we show that...