Add to ORKGWe obtain an almost everywhere quantifier elimination for (the non-critical fragment of) the logic with probability quantifiers, introduced by the first author in [10]. This logic has quantifiers like ∃≥3/4y, which says that “for at least 3/4 of all y”. These results improve upon the 0-1 law for a fragment of this logic obtained by Knyazev [11]. Our improvements are: 1. We deal with the quantifier ∃≥ry, where y is a tuple of variables. 2. We remove the closedness restriction, which requires that the variables in y occur in all atomic subformulas of the quantifier scope. 3. Instead of the unbiased measure where each model with universe n has the same probability, we work with any measure generated by independent atomic probabilities pR for e...
AbstractWe investigate the infinitary logic L∞ωω, in which sentences may have arbitrary disjunctions...
First-order model counting emerged recently as a novel rea- soning task, at the core of efficient al...
The probabilistic logic FP(¿, ¿) was axiomatized with the aim of presenting a formal setting for rea...
We introduce a formal logical language, called conditional probability logic (CPL), which extends fi...
This thesis presents a systematic study of the model theory of probability algebras, random variabl...
AbstractSuppose we are given a set W of logical structures, or possible worlds, a set of logical for...
Projet MEVAL, Projet VERSO/http://ieeexplore.ieee.org/We study the impact of adding certain families...
AbstractWe study existential and universal quantification over quantifiers, i.e. quantification wher...
When “A ⌫ B ” we say that “event A is at least as probable as event B”. This is a qualitative probab...
AbstractWe consider extensions of first order logic (FO) and fixed point logic (FP) by means of gene...
Part1. Subjective and objective interpretations of probability are described. The organization of th...
AbstractFirst-order logic is known to have a severely limited expressive power on finite structures....
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
We consider extensions of first order logic (FO) and fixed point logic (FP) by means of generalized ...
In the spirit of Tarski’s 1930 work, “The concept of Truth in Formalized languages,” we define proba...
AbstractWe investigate the infinitary logic L∞ωω, in which sentences may have arbitrary disjunctions...
First-order model counting emerged recently as a novel rea- soning task, at the core of efficient al...
The probabilistic logic FP(¿, ¿) was axiomatized with the aim of presenting a formal setting for rea...
We introduce a formal logical language, called conditional probability logic (CPL), which extends fi...
This thesis presents a systematic study of the model theory of probability algebras, random variabl...
AbstractSuppose we are given a set W of logical structures, or possible worlds, a set of logical for...
Projet MEVAL, Projet VERSO/http://ieeexplore.ieee.org/We study the impact of adding certain families...
AbstractWe study existential and universal quantification over quantifiers, i.e. quantification wher...
When “A ⌫ B ” we say that “event A is at least as probable as event B”. This is a qualitative probab...
AbstractWe consider extensions of first order logic (FO) and fixed point logic (FP) by means of gene...
Part1. Subjective and objective interpretations of probability are described. The organization of th...
AbstractFirst-order logic is known to have a severely limited expressive power on finite structures....
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
We consider extensions of first order logic (FO) and fixed point logic (FP) by means of generalized ...
In the spirit of Tarski’s 1930 work, “The concept of Truth in Formalized languages,” we define proba...
AbstractWe investigate the infinitary logic L∞ωω, in which sentences may have arbitrary disjunctions...
First-order model counting emerged recently as a novel rea- soning task, at the core of efficient al...
The probabilistic logic FP(¿, ¿) was axiomatized with the aim of presenting a formal setting for rea...