We present decision procedures for logical constraints that support reasoning about collections of elements such as sets, multisets, and fuzzy sets. Element membership in such collections is given by a characteristic function from a finite universe (of unknown size) to a subset of rational numbers specified by user-defined constraints in mixed linear integer-rational arithmetic. Our logic supports standard operators such as union, intersection, difference, or any operation defined pointwise using mixed linear integer-rational arithmetic. Moreover, it supports the notion of cardinality of the collection. Deciding formulas in such logic has application in verification of data structures. Our decision procedure reduces satisfiability of formul...
We work in the setting of Zermelo-Fraenkel set theory without assuming the Axiom of Choice. We consi...
The broad goal in this thesis is to enumerate elements and fuzzy subsets of a finite set enjoying so...
This paper surveys various decidability results in the set theory. In the first part, we focus on ce...
We consider an extension of integer linear arithmetic with a “star” operator takes closure under vec...
Logics that involve collections (sets, multisets), and cardinality constraints are useful for reason...
We consider the problem of deciding the satisfiability of quantifier-freeformulas in the theory of f...
This system description provides an overview of the MUNCH reasoner for sets and multisets. MUNCH tak...
Motivated by applications in software verification, we explore automated reasoning about the non-dis...
Logics that involve collections (sets, multisets), and cardinality constraints are useful for reason...
Data structures often use an integer variable to keep track of the number of elements they store. An...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
International audienceLocal consistency techniques have been introduced in logic programming in orde...
We introduce a new description logic that extends the well-known logic ALCQ by allowing the statemen...
Well-partial orders, and the ordinal invariants used to measure them, are relevant in set theory, pr...
Complexity of data structures in modern programs presents a challenge for current analysis and verif...
We work in the setting of Zermelo-Fraenkel set theory without assuming the Axiom of Choice. We consi...
The broad goal in this thesis is to enumerate elements and fuzzy subsets of a finite set enjoying so...
This paper surveys various decidability results in the set theory. In the first part, we focus on ce...
We consider an extension of integer linear arithmetic with a “star” operator takes closure under vec...
Logics that involve collections (sets, multisets), and cardinality constraints are useful for reason...
We consider the problem of deciding the satisfiability of quantifier-freeformulas in the theory of f...
This system description provides an overview of the MUNCH reasoner for sets and multisets. MUNCH tak...
Motivated by applications in software verification, we explore automated reasoning about the non-dis...
Logics that involve collections (sets, multisets), and cardinality constraints are useful for reason...
Data structures often use an integer variable to keep track of the number of elements they store. An...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
International audienceLocal consistency techniques have been introduced in logic programming in orde...
We introduce a new description logic that extends the well-known logic ALCQ by allowing the statemen...
Well-partial orders, and the ordinal invariants used to measure them, are relevant in set theory, pr...
Complexity of data structures in modern programs presents a challenge for current analysis and verif...
We work in the setting of Zermelo-Fraenkel set theory without assuming the Axiom of Choice. We consi...
The broad goal in this thesis is to enumerate elements and fuzzy subsets of a finite set enjoying so...
This paper surveys various decidability results in the set theory. In the first part, we focus on ce...