AbstractWe consider a language for reasoning about probability which allows us to make statements such as “the probability of E1 is less than 13” and “the probability of E1 is at least twice the probability of E2,” where E1 and E2 are arbitrary events. We consider the case where all events are measurable (i.e., represent measurable sets) and the more general case, which is also of interest in practice, where they may not be measurable. The measurable case is essentially a formalization of (the propositional fragment of) Nilsson's probabilistic logic. As we show elsewhere, the general (nonmeasurable) case corresponds precisely to replacing probability measures by Dempster-Shafer belief functions. In both cases, we provide a complete axiomati...
The propositional language extended by two families of unary propositional probability operators and...
AbstractProbability is usually closely related to Boolean structures, i.e., Boolean algebras or prop...
We solve two fundamental problems of probabilistic reasoning: given finitely many conditional probab...
AbstractWe consider a language for reasoning about probability which allows us to make statements su...
Part1. Subjective and objective interpretations of probability are described. The organization of th...
In this chapter we present a formal system that results from the combination of two well known forma...
The probability theory is a well-studied branch of mathematics, in order to carry out formal reasoni...
AbstractThe paper presents the proof-theoretical approach to a probabilistic logic which allows expr...
We present a proof-theoretical and model-theoretical approach to reasoning about knowledge and condi...
Abstract Probabilistic logics combine the expressive power of logic with the ability to reason with ...
We present a proof-theoretical and model-theoretical approach to reasoning about knowledge and condi...
In [1], two logics for reasoning about probabilities were introduced. The first was unable to reason...
AbstractOf all scientific investigations into reasoning with uncertainty and chance, probability the...
Epistemic logics are formal models designed in order to reason about the knowledge of agents and the...
We introduce a new approach to probabilistic logic programming in which probabilities are defined ov...
The propositional language extended by two families of unary propositional probability operators and...
AbstractProbability is usually closely related to Boolean structures, i.e., Boolean algebras or prop...
We solve two fundamental problems of probabilistic reasoning: given finitely many conditional probab...
AbstractWe consider a language for reasoning about probability which allows us to make statements su...
Part1. Subjective and objective interpretations of probability are described. The organization of th...
In this chapter we present a formal system that results from the combination of two well known forma...
The probability theory is a well-studied branch of mathematics, in order to carry out formal reasoni...
AbstractThe paper presents the proof-theoretical approach to a probabilistic logic which allows expr...
We present a proof-theoretical and model-theoretical approach to reasoning about knowledge and condi...
Abstract Probabilistic logics combine the expressive power of logic with the ability to reason with ...
We present a proof-theoretical and model-theoretical approach to reasoning about knowledge and condi...
In [1], two logics for reasoning about probabilities were introduced. The first was unable to reason...
AbstractOf all scientific investigations into reasoning with uncertainty and chance, probability the...
Epistemic logics are formal models designed in order to reason about the knowledge of agents and the...
We introduce a new approach to probabilistic logic programming in which probabilities are defined ov...
The propositional language extended by two families of unary propositional probability operators and...
AbstractProbability is usually closely related to Boolean structures, i.e., Boolean algebras or prop...
We solve two fundamental problems of probabilistic reasoning: given finitely many conditional probab...