Add to ORKGIn this work, we develop a randomized bounded arithmetic for probabilistic computation, following the approach adopted by Buss for non-randomized computation. This work relies on a notion of representability inspired by of Buss' one, but depending on a non-standard quantitative and measurable semantic. Then, we establish that the representable functions are exactly the ones in PPT. Finally, we extend the language of our arithmetic with a measure quantifier, which is true if and only if the quantified formula's semantic has measure greater than a given threshold. This allows us to define purely logical characterizations of standard probabilistic complexity classes such as BPP, RP, co-RP and ZPP
International audienceRandomized algorithms are widely used for finding efficiently approximated sol...
Probabilistic logics combine the expressive power of logic with the ability to reason with uncertain...
Nondeterministic weighted automata are finite automata with numerical weights on transitions. They d...
The first theme of this thesis investigates the complexity class CC and its associated bounded-arith...
It is known that bounded error probabilistic polynomial time (BPP) languages are accepted by polynom...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
Various types of probabilistic algorithms play an increasingly important role in computer science, e...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
We define probabilistic martingales based on randomized approximation schemes, and show that the res...
Probabilistic programming has many applications in statistics, physics, ... so that all programming ...
We show that probabilistic computable functions, i.e., those functions outputting distributions and ...
In this dissertation we consider two different notions of randomness and their applications to probl...
In this thesis we examine some of the central problems in the theory of computational complexity, l...
Automata with monitor counters, where the transitions do not depend on counter values, and nested we...
In this paper we give an introduction to the connection between complexity theory and the study of r...
International audienceRandomized algorithms are widely used for finding efficiently approximated sol...
Probabilistic logics combine the expressive power of logic with the ability to reason with uncertain...
Nondeterministic weighted automata are finite automata with numerical weights on transitions. They d...
The first theme of this thesis investigates the complexity class CC and its associated bounded-arith...
It is known that bounded error probabilistic polynomial time (BPP) languages are accepted by polynom...
AbstractGeneral properties and proof techniques concerning probabilistic complexity classes are disc...
Various types of probabilistic algorithms play an increasingly important role in computer science, e...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
We define probabilistic martingales based on randomized approximation schemes, and show that the res...
Probabilistic programming has many applications in statistics, physics, ... so that all programming ...
We show that probabilistic computable functions, i.e., those functions outputting distributions and ...
In this dissertation we consider two different notions of randomness and their applications to probl...
In this thesis we examine some of the central problems in the theory of computational complexity, l...
Automata with monitor counters, where the transitions do not depend on counter values, and nested we...
In this paper we give an introduction to the connection between complexity theory and the study of r...
International audienceRandomized algorithms are widely used for finding efficiently approximated sol...
Probabilistic logics combine the expressive power of logic with the ability to reason with uncertain...
Nondeterministic weighted automata are finite automata with numerical weights on transitions. They d...