AbstractWe are interested in separating classes in the exponential-time hierarchy, EXPH, from classes in the polynomial-time hierarchy, PH. In this paper we show that, for any fixed integer c, the class of sets accepted in deterministic polynomial time using at most O(nc) queries to an NP oracle, PNP[O(nc)], is a proper subset of NEXP. This improves a previous result by Fu et al. [7]. Further, we generalize this separation to related levels of PH and EXPH showing that, for any fixed integer c and i ⩾ 1, ΔiP[O(nc)] ⊊ ∑i − 1EXP. This improves the long standing separations which result from the relativization of the time hierarchy theorem [9, 6, 17, 3, 1]
AbstractWe prove that if S is a sparse oracle for NP, then S is a sparse oracle for the polynomialti...
Downward collapse (a.k.a. upward separation) refers to cases where the equality of two larger classe...
Chang and Kadin have shown that if the difference hierarchy over NP collapses to level $k$, then the...
AbstractWe are interested in separating classes in the exponential-time hierarchy, EXPH, from classe...
AbstractComposed of the levels E (i.e., ∪c DTIME[2cn]), NE, PNE, NPNE, etc., the strong exponential ...
Abstract"Downward separation" results show that when small classes collapse, larger ones also collap...
We extend previous collapsing results involving the exponential hierarchy by using recent hardness-r...
We show several unconditional lower bounds for exponential time classes against polynomial time clas...
We show several unconditional lower bounds for exponential time classes against polynomial time clas...
This paper investigates the complexity of the high levels of the exponential hierarchy [HY84,HIS85]...
. Buhrman and Torenvliet created an oracle relative to which P NP = NEXP and thus P NP = P NEX...
This paper studies the range of application of the upward separation technique that has been introdu...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
Chang and Kadin have shown that if the difference hierarchy over NP collapses to level k, then the p...
The possible relationships between NP and EXPAk = ∪∞c = 0 DTIME (2cnk) relative to oracles are exami...
AbstractWe prove that if S is a sparse oracle for NP, then S is a sparse oracle for the polynomialti...
Downward collapse (a.k.a. upward separation) refers to cases where the equality of two larger classe...
Chang and Kadin have shown that if the difference hierarchy over NP collapses to level $k$, then the...
AbstractWe are interested in separating classes in the exponential-time hierarchy, EXPH, from classe...
AbstractComposed of the levels E (i.e., ∪c DTIME[2cn]), NE, PNE, NPNE, etc., the strong exponential ...
Abstract"Downward separation" results show that when small classes collapse, larger ones also collap...
We extend previous collapsing results involving the exponential hierarchy by using recent hardness-r...
We show several unconditional lower bounds for exponential time classes against polynomial time clas...
We show several unconditional lower bounds for exponential time classes against polynomial time clas...
This paper investigates the complexity of the high levels of the exponential hierarchy [HY84,HIS85]...
. Buhrman and Torenvliet created an oracle relative to which P NP = NEXP and thus P NP = P NEX...
This paper studies the range of application of the upward separation technique that has been introdu...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
Chang and Kadin have shown that if the difference hierarchy over NP collapses to level k, then the p...
The possible relationships between NP and EXPAk = ∪∞c = 0 DTIME (2cnk) relative to oracles are exami...
AbstractWe prove that if S is a sparse oracle for NP, then S is a sparse oracle for the polynomialti...
Downward collapse (a.k.a. upward separation) refers to cases where the equality of two larger classe...
Chang and Kadin have shown that if the difference hierarchy over NP collapses to level $k$, then the...