We consider an extension of integer linear arithmetic with a “star” operator takes closure under vector addition of the solution set of a linear arithmetic subformula. We show that the satisfiability problem for this extended language remains in NP (and therefore NP-complete). Our proof uses semilinear set characterization of solutions of integer linear arithmetic formulas, as well as a generalization of a recent result on sparse solutions of integer linear programming problems. As a consequence of our result, we present worst-case optimal decision procedures for two NP-hard problems that were previously not known to be in NP. The first is the satisfiability problem for a logic of sets, multisets (bags), and cardinality constraints, which h...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
peer reviewedThis paper considers finite-automata based algorithms for handling linear arithmetic wi...
Given a linear equation L, a set A of integers is L-free if A does not contain any non-trivial solut...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We present decision procedures for logical constraints that support reasoning about collections of e...
Motivated by satisfiability of constraints with function symbols, we consider numerical inequalities...
International audienceWe consider feasibility of linear integer problems in the context of verificat...
Recent advances in solving propositional satisfiability problems (SAT) have extended their applicati...
This thesis concerns decision procedures for fragments of linear arithmetic and their application to...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
This paper introduces a finite-automata based representation of Presburger arithmetic definable set...
This article considers finite-automata-based algorithms for handling linear arithmetic with both rea...
We present new methods for solving the Satisfiability Modulo Theories problem over the theory of Qua...
This paper resolves two open problems on linear integer arithmetic (LIA), also known as Presburger a...
We look at a restricted model of a multihead pushdown automaton and use some of its properties to sh...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
peer reviewedThis paper considers finite-automata based algorithms for handling linear arithmetic wi...
Given a linear equation L, a set A of integers is L-free if A does not contain any non-trivial solut...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We present decision procedures for logical constraints that support reasoning about collections of e...
Motivated by satisfiability of constraints with function symbols, we consider numerical inequalities...
International audienceWe consider feasibility of linear integer problems in the context of verificat...
Recent advances in solving propositional satisfiability problems (SAT) have extended their applicati...
This thesis concerns decision procedures for fragments of linear arithmetic and their application to...
Abstract. Boolean Algebra with Presburger Arithmetic (BAPA) is a decidable logic that can express co...
This paper introduces a finite-automata based representation of Presburger arithmetic definable set...
This article considers finite-automata-based algorithms for handling linear arithmetic with both rea...
We present new methods for solving the Satisfiability Modulo Theories problem over the theory of Qua...
This paper resolves two open problems on linear integer arithmetic (LIA), also known as Presburger a...
We look at a restricted model of a multihead pushdown automaton and use some of its properties to sh...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
peer reviewedThis paper considers finite-automata based algorithms for handling linear arithmetic wi...
Given a linear equation L, a set A of integers is L-free if A does not contain any non-trivial solut...