Given a formula in quantifier-free Presburger arithmetic, if it has a satisfying solution, there is one whose size, measured in bits, is polynomially bounded in the size of the formula. In this paper, we consider a special class of quantifier-free Presburger formulas in which most linear constraints are difference (separation) constraints, and the non-difference constraints are sparse. This class has been observed to commonly occur in software verification. We derive a new solution bound in terms of parameters characterizing the sparseness of linear constraints and the number of non-difference constraints, in addition to traditional measures of formula size. In particular, we show that the number of bits needed per integer variable is line...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
The inference of program invariants over machine arithmetic, commonly called bit-vector arithmetic, ...
AbstractIt is shown how the method of Fischer and Rabin can be extended to get good lower bounds for...
Given a formula in quantifier-free Presburger arithmetic, if it has a satisfying solution, there is ...
Abstract: "Given a formula [Phi] in quantifier-free Presburger arithmetic, it is well known that, if...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) combines 1) Boolean algebras of sets of ...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
Abstract: "We present a new abstraction-based framework for deciding satisfiability of quantifier-fr...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
Abstract. We make a number of contributions to the understanding and practical resolution of quantif...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
We describe an algorithm for deciding the first-order multisorted theory BAPA, which combines 1) Boo...
This work studies the computational complexity of the decision procedures for Presburger Arithmetic ...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
The inference of program invariants over machine arithmetic, commonly called bit-vector arithmetic, ...
AbstractIt is shown how the method of Fischer and Rabin can be extended to get good lower bounds for...
Given a formula in quantifier-free Presburger arithmetic, if it has a satisfying solution, there is ...
Abstract: "Given a formula [Phi] in quantifier-free Presburger arithmetic, it is well known that, if...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) combines 1) Boolean algebras of sets of ...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
Abstract: "We present a new abstraction-based framework for deciding satisfiability of quantifier-fr...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
Abstract. We make a number of contributions to the understanding and practical resolution of quantif...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
We describe an algorithm for deciding the first-order multisorted theory BAPA, which combines 1) Boo...
This work studies the computational complexity of the decision procedures for Presburger Arithmetic ...
Abstract. We describe an algorithm for deciding the first-order multisorted theory BAPA, which combi...
The inference of program invariants over machine arithmetic, commonly called bit-vector arithmetic, ...
AbstractIt is shown how the method of Fischer and Rabin can be extended to get good lower bounds for...