International audienceIn [5], Angluin et al. proved that population protocols compute exactly the predicates definable in Presburger arithmetic (PA), the first-order theory of addition. As part of this result, they presented a procedure that translates any formula $ϕ$ of quantifier-free PA with remainder predicates (which has the same expressive power as full PA) into a population protocol with $2 O(poly(|ϕ|))$ states that computes $ϕ$. More precisely, the number of states of the protocol is exponential in both the bit length of the largest coefficient in the formula, and the number of nodes of its syntax tree. In this paper, we prove that every formula $ϕ$ of quantifier-free PA with remainder predicates is computable by a leaderless popula...
A wide variety of problems in Discrete Optimization and Integer Programming can be naturally phrased...
Population protocols are a distributed computing model appropriate for describing massive numbers of...
We consider an expansion of Presburger arithmetic which allows multiplication by k parameters t1, ho...
International audienceIn [5], Angluin et al. proved that population protocols compute exactly the pr...
In their 2006 seminal paper in Distributed Computing, Angluin et al. present a construction that, gi...
Population protocols are a well established model of distributed computation by mobile finite-state ...
Population protocols were introduced by Angluin et al. in 2004 to study the theoretical properties o...
We consider a first-order logic for the integers with addition. This logicextends classical first-or...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
Abstract. We consider Presburger arithmetic (PA) extended with mod-ulo counting quantifiers. We show...
This work studies the computational complexity of the decision procedures for Presburger Arithmetic ...
AbstractWe investigate the complexity of subclasses of Presburger arithmetic, i.e., the first-order ...
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
Population protocols are a formal model of computation by identical, anonymous mobile agents interac...
In this paper, we continue a line of work on obtaining succinct population protocols for Presburger-...
A wide variety of problems in Discrete Optimization and Integer Programming can be naturally phrased...
Population protocols are a distributed computing model appropriate for describing massive numbers of...
We consider an expansion of Presburger arithmetic which allows multiplication by k parameters t1, ho...
International audienceIn [5], Angluin et al. proved that population protocols compute exactly the pr...
In their 2006 seminal paper in Distributed Computing, Angluin et al. present a construction that, gi...
Population protocols are a well established model of distributed computation by mobile finite-state ...
Population protocols were introduced by Angluin et al. in 2004 to study the theoretical properties o...
We consider a first-order logic for the integers with addition. This logicextends classical first-or...
We give a new quantifier elimination procedure for Presburger arithmetic extended with a unary count...
Abstract. We consider Presburger arithmetic (PA) extended with mod-ulo counting quantifiers. We show...
This work studies the computational complexity of the decision procedures for Presburger Arithmetic ...
AbstractWe investigate the complexity of subclasses of Presburger arithmetic, i.e., the first-order ...
This paper gives a thorough overview of what is known about first-order logic with counting quantif...
Population protocols are a formal model of computation by identical, anonymous mobile agents interac...
In this paper, we continue a line of work on obtaining succinct population protocols for Presburger-...
A wide variety of problems in Discrete Optimization and Integer Programming can be naturally phrased...
Population protocols are a distributed computing model appropriate for describing massive numbers of...
We consider an expansion of Presburger arithmetic which allows multiplication by k parameters t1, ho...