The theory of arrays, introduced by McCarthy in his seminal paper “Towards a mathematical science of computation,” is central to Computer Science. Unfortunately, the theory alone is not sufficient for many important verification applications such as program analysis. Motivated by this observation, we study extensions of the theory of arrays whose satisfiability problem (i.e., checking the satisfiability of conjunctions of ground literals) is decidable. In particular, we consider extensions where the indexes of arrays have the algebraic structure of Presburger arithmetic and the theory of arrays is augmented with axioms characterizing additional symbols such as dimension, sortedness, or the domain of definition of arrays. We provide methods ...
The topic of this article is decision procedures for satisfiability modulo theories (SMT) of arbitra...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
AbstractThe rewrite-based approach to satisfiability modulo theories consists of using generic theor...
International audienceThe theory of arrays, introduced by McCarthy in his seminal paper "Towards a m...
The theory of arrays, introduced by McCarthy in his seminal paper “Toward a mathematical science of ...
The theory of arrays, introduced by McCarthy in his seminal paper “Toward a mathematical science of...
A decision procedure for a theory of arrays is of inter-est for applications in formal verification,...
The theory of arrays read(write(a, i,e), i) = e i 6 = j → read(write(a, i,e), j) = read(a, j) ∀i.(...
AbstractWe show how a well-known superposition-based inference system for first-order equational log...
AbstractTerm algebras can model recursive data structures which are widely used in programming langu...
A variety of concepts, laws, and notations are presented which facilitate reasoning about arrays. Th...
We outline an approach to use ordering-based theorem-proving strategies as satisfiability procedures...
The (extensional) theory of arrays is widely used to model systems. Hence, efficient decision proced...
We describe an algorithm for deciding the first-order multisorted theory BAPA, which combines 1) Boo...
AbstractThe topic of this article is decision procedures for satisfiability modulo theories (SMT) of...
The topic of this article is decision procedures for satisfiability modulo theories (SMT) of arbitra...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
AbstractThe rewrite-based approach to satisfiability modulo theories consists of using generic theor...
International audienceThe theory of arrays, introduced by McCarthy in his seminal paper "Towards a m...
The theory of arrays, introduced by McCarthy in his seminal paper “Toward a mathematical science of ...
The theory of arrays, introduced by McCarthy in his seminal paper “Toward a mathematical science of...
A decision procedure for a theory of arrays is of inter-est for applications in formal verification,...
The theory of arrays read(write(a, i,e), i) = e i 6 = j → read(write(a, i,e), j) = read(a, j) ∀i.(...
AbstractWe show how a well-known superposition-based inference system for first-order equational log...
AbstractTerm algebras can model recursive data structures which are widely used in programming langu...
A variety of concepts, laws, and notations are presented which facilitate reasoning about arrays. Th...
We outline an approach to use ordering-based theorem-proving strategies as satisfiability procedures...
The (extensional) theory of arrays is widely used to model systems. Hence, efficient decision proced...
We describe an algorithm for deciding the first-order multisorted theory BAPA, which combines 1) Boo...
AbstractThe topic of this article is decision procedures for satisfiability modulo theories (SMT) of...
The topic of this article is decision procedures for satisfiability modulo theories (SMT) of arbitra...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
AbstractThe rewrite-based approach to satisfiability modulo theories consists of using generic theor...