AbstractWe consider inclusion relations among a multitude of classical complexity classes and classes with probabilistic components. A key tool is a method for characterizing such classes in terms of the ordinary quantifiers ∃ and ∠ together with a quantifier ∃+, which means roughly “for most,” applied to polynomial-time predicates. This approach yields a uniform treatment which leads to easier proofs for class-inclusion and hierarchy-collapse results. Furthermore, the method captures some recently introduced game classes and game hierarchies. This survey also includes a charting of class-inclusion and oracle-based separation results
Various types of probabilistic algorithms play an increasingly important role in computer science, e...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
AbstractWe consider inclusion relations among a multitude of classical complexity classes and classe...
Many computable problems can be solved more efficiently or in a more natural way through probabilist...
In this paper, we study the game-theoretic and computational repercussions of Henkin’s partially ord...
We show that every set in the ΘP2 level of the polynomial hierarchy -- that is, every set polynomial...
In a recent paper, the author has shown how Interaction Graphs models for linear logic can be used t...
We show that if a complexity class C is closed downward under polynomialtime majority truth-table re...
An oracle X is constructed such that the exponential complexity class ΔEP,X2 equals the probabilisti...
The report is a compilation of lecture notes that were prepared during the course ``Interactive Proo...
The complexity class BPP (defined by Gill) contains problems that can be solved in polynomial time w...
AbstractWe define a probabilistic game automaton, a general model of a two-person game. We show how ...
A Quantified Linear Implication (QLI) is an inclusion query over two polyhedral sets, with a quanti...
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...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
AbstractWe consider inclusion relations among a multitude of classical complexity classes and classe...
Many computable problems can be solved more efficiently or in a more natural way through probabilist...
In this paper, we study the game-theoretic and computational repercussions of Henkin’s partially ord...
We show that every set in the ΘP2 level of the polynomial hierarchy -- that is, every set polynomial...
In a recent paper, the author has shown how Interaction Graphs models for linear logic can be used t...
We show that if a complexity class C is closed downward under polynomialtime majority truth-table re...
An oracle X is constructed such that the exponential complexity class ΔEP,X2 equals the probabilisti...
The report is a compilation of lecture notes that were prepared during the course ``Interactive Proo...
The complexity class BPP (defined by Gill) contains problems that can be solved in polynomial time w...
AbstractWe define a probabilistic game automaton, a general model of a two-person game. We show how ...
A Quantified Linear Implication (QLI) is an inclusion query over two polyhedral sets, with a quanti...
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...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...