AbstractWe define a concept of probability on an n-valued Lukasiewicz-Moisilalgebra and we present some basic properties. The main result is an extension theorem for continuous probabilities, which is already known for probabilities defined on Boolean algebras and MV-algebas
We develop a probabilistic semantics for modal logic, which was introduced in recent years by Dana S...
Let B be a Boolean Algebra and S a subset of B. An S-coherent family of probabilities is defined ...
The aim of the papers is to present and discuss the most direct issues on relation between logical ...
AbstractWe define a concept of probability on an n-valued Lukasiewicz-Moisilalgebra and we present s...
We will present proof-theoretical and algebraic properties for the probability logic FP(L,L), meant ...
Possibility and necessity measures are commonly defined over Boolean algebras. This work considers a...
We obtain the extension theorems of finitely additive probabilities, due to Tarski (1930), Nikodim (...
The paper concerns the algebraic structure of the set of cumulative distribution functions as well a...
In his foundation of probability theory, Bruno de Finetti devised a betting scheme where a bookmaker...
The deep relation between states of an MV-algebra M and betting on the continuous-valued events defi...
summary:MV-algebras can be treated as non-commutative generalizations of boolean algebras. The proba...
This paper is devoted to a logical and algebraic treatment of conditional probability. The main idea...
The paper concerns the algebraic structure of the set of cumulative distribution functions as well a...
There are two probabilistic algebras: one for classical probability and the other for quantum mechan...
The Lukasiewicz-Moisil algebras were created by Moisil as an algebraic counterpart for the many-valu...
We develop a probabilistic semantics for modal logic, which was introduced in recent years by Dana S...
Let B be a Boolean Algebra and S a subset of B. An S-coherent family of probabilities is defined ...
The aim of the papers is to present and discuss the most direct issues on relation between logical ...
AbstractWe define a concept of probability on an n-valued Lukasiewicz-Moisilalgebra and we present s...
We will present proof-theoretical and algebraic properties for the probability logic FP(L,L), meant ...
Possibility and necessity measures are commonly defined over Boolean algebras. This work considers a...
We obtain the extension theorems of finitely additive probabilities, due to Tarski (1930), Nikodim (...
The paper concerns the algebraic structure of the set of cumulative distribution functions as well a...
In his foundation of probability theory, Bruno de Finetti devised a betting scheme where a bookmaker...
The deep relation between states of an MV-algebra M and betting on the continuous-valued events defi...
summary:MV-algebras can be treated as non-commutative generalizations of boolean algebras. The proba...
This paper is devoted to a logical and algebraic treatment of conditional probability. The main idea...
The paper concerns the algebraic structure of the set of cumulative distribution functions as well a...
There are two probabilistic algebras: one for classical probability and the other for quantum mechan...
The Lukasiewicz-Moisil algebras were created by Moisil as an algebraic counterpart for the many-valu...
We develop a probabilistic semantics for modal logic, which was introduced in recent years by Dana S...
Let B be a Boolean Algebra and S a subset of B. An S-coherent family of probabilities is defined ...
The aim of the papers is to present and discuss the most direct issues on relation between logical ...
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