We define the inverse operation for disjunctive completion, introducing the notion of least disjunctive basis for an abstract domain $D$: this is the most abstract domain inducing the same disjunctive completion as $D$. We show that the least disjunctive basis exists in most cases, and study its properties in relation with reduced product of abstract interpretations. The resulting framework is powerful enough to be applied to arbitrary abstract domains for analysis, providing advanced algebraic methods for domain manipulation and optimization. These notions are applied to abstract domains for analysis of functional and logic programming languages
Completeness is important in approximated semantics design by abstract interpretation, ensuring t...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
AbstractIn this paper we propose a simple framework based on first-order logic, for the design and d...
We define the inverse operation for disjunctive completion, introducing the notion of least disjunct...
We define the inverse operation for disjunctive completion, introducing the notion of least disjunct...
We define the inverse operation for disjunctive completion of abstract interpretations, introducing ...
AbstractIn the context of standard abstract interpretation theory, we define the inverse operation t...
In the context of standard abstract interpretation theory, we define the inverse operation to the di...
The concept of abstract interpretation has been introduced by Patrick and Radhia Cousot in 1977, in ...
Completeness is an ideal, although uncommon, feature of abstract interpretations, formalizing the in...
The reduced product of abstract domains is a rather well known operation in abstract interpretation....
The reduced product of abstract domains is a rather well known operation in abstract interpretation....
Completeness in abstract interpretation is an ideal and rare situation where the abstract semantics ...
AbstractIn the context of the abstract interpretation theory, we study the relations among various a...
Completeness is an important, but rather uncommon, property of abstract interpretations, ensuring th...
Completeness is important in approximated semantics design by abstract interpretation, ensuring t...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
AbstractIn this paper we propose a simple framework based on first-order logic, for the design and d...
We define the inverse operation for disjunctive completion, introducing the notion of least disjunct...
We define the inverse operation for disjunctive completion, introducing the notion of least disjunct...
We define the inverse operation for disjunctive completion of abstract interpretations, introducing ...
AbstractIn the context of standard abstract interpretation theory, we define the inverse operation t...
In the context of standard abstract interpretation theory, we define the inverse operation to the di...
The concept of abstract interpretation has been introduced by Patrick and Radhia Cousot in 1977, in ...
Completeness is an ideal, although uncommon, feature of abstract interpretations, formalizing the in...
The reduced product of abstract domains is a rather well known operation in abstract interpretation....
The reduced product of abstract domains is a rather well known operation in abstract interpretation....
Completeness in abstract interpretation is an ideal and rare situation where the abstract semantics ...
AbstractIn the context of the abstract interpretation theory, we study the relations among various a...
Completeness is an important, but rather uncommon, property of abstract interpretations, ensuring th...
Completeness is important in approximated semantics design by abstract interpretation, ensuring t...
Completeness is a desirable, although uncommon, property of abstract interpretations, formalizing th...
AbstractIn this paper we propose a simple framework based on first-order logic, for the design and d...