The existence of immune and simple sets in relativizations of the probabilistic polynomial time bounded classes is studied. Some techniques previously used to show similar results for relativizations of P and NP are adapted to the probabilistic classes. Using these results, an exhaustive settling of all possible strong separations among these relativized classes is obtained.On étudie les relativisations des classes de complexité probabiliste polynômiale. On adapte aux classes probabilistes des techniques déjà utilisées pour établir des résultats similaires pour les relativisations de P et NP. On obtient à partir de ces résultats une classification de toutes les propriétés de séparation forte pour ces classes relativisées.Peer Reviewe
AbstractWe consider several questions on the computational power of PP, the class of sets accepted b...
In this paper we show that the techniques introduced by Furst (1984), which connected oracle separat...
AbstractA set A is P-bi-immune if neither A nor its complement has an infinite subset in P. We inves...
The existence of immune and simple sets in relativizations of the probabilistic polynomial time boun...
Various types of probabilistic algorithms play an increasingly important role in computer science, e...
An oracle X is constructed such that the exponential complexity class ΔEP,X2 equals the probabilisti...
The thesis applies the ICC tecniques to the probabilistic polinomial complexity classes in order to ...
AbstractWe consider inclusion relations among a multitude of classical complexity classes and classe...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
Ko [26] and Bruschi [11] independently showed that, in some relativized world, PSPACE (in fact, ⊕P) ...
Ko and Bruschi showed that in some relativized world, PSPACE (in fact, ParityP) contains a set that ...
The resource-bounded measures of complexity classes are shown to be robust with respect to certain c...
The complexity class BPP (defined by Gill) contains problems that can be solved in polynomial time w...
Abstract: We study a time bounded variant of Kolmogorov complexity. This motion, together with unive...
We investigate algebraic, logical, and geometric properties of concepts recognized by various class...
AbstractWe consider several questions on the computational power of PP, the class of sets accepted b...
In this paper we show that the techniques introduced by Furst (1984), which connected oracle separat...
AbstractA set A is P-bi-immune if neither A nor its complement has an infinite subset in P. We inves...
The existence of immune and simple sets in relativizations of the probabilistic polynomial time boun...
Various types of probabilistic algorithms play an increasingly important role in computer science, e...
An oracle X is constructed such that the exponential complexity class ΔEP,X2 equals the probabilisti...
The thesis applies the ICC tecniques to the probabilistic polinomial complexity classes in order to ...
AbstractWe consider inclusion relations among a multitude of classical complexity classes and classe...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
Ko [26] and Bruschi [11] independently showed that, in some relativized world, PSPACE (in fact, ⊕P) ...
Ko and Bruschi showed that in some relativized world, PSPACE (in fact, ParityP) contains a set that ...
The resource-bounded measures of complexity classes are shown to be robust with respect to certain c...
The complexity class BPP (defined by Gill) contains problems that can be solved in polynomial time w...
Abstract: We study a time bounded variant of Kolmogorov complexity. This motion, together with unive...
We investigate algebraic, logical, and geometric properties of concepts recognized by various class...
AbstractWe consider several questions on the computational power of PP, the class of sets accepted b...
In this paper we show that the techniques introduced by Furst (1984), which connected oracle separat...
AbstractA set A is P-bi-immune if neither A nor its complement has an infinite subset in P. We inves...