AbstractIt has been known for a long time that the sets of integer vectors that are recognizable by finite-state automata are those that can be defined in an extension of Presburger arithmetic. In this paper, we address the problem of deciding whether the closure of a linear transformation preserves the recognizable nature of sets of integer vectors. We solve this problem by introducing an original extension of the concept of recognizability to sets of vectors with complex components. This generalization allows to obtain a simple necessary and sufficient condition over linear transformations, in terms of the eigenvalues of the transformation matrix. We then show that these eigenvalues do not need to be computed explicitly in order to evalua...
In this paper we discuss efficient symbolic representations for infinite-state systems specified usi...
In this thesis, we study and answer several questions concerning recognizability of integer sets by ...
The Number Decision Diagram (NDD) has recently been introduced as a powerful representation system ...
AbstractIt has been known for a long time that the sets of integer vectors that are recognizable by ...
peer reviewedIf read digit by digit, a n-dimensional vector of integers represented in base r can b...
Abstract. This paper studies the expressive power of finite-state automata recognizing sets of real ...
This article studies the expressive power of finite-state automata recognizing sets of real numbers ...
AbstractThis article studies the expressive power of finite-state automata recognizing sets of real ...
peer reviewedThis paper studies the expressive power of finite-state automata recognizing sets of re...
International audienceThe least significant digit first decomposition of integer vectors into words ...
Abstract This work studies the properties of finite automata recogniz-ing vectors with real componen...
Les automates finis permettent de représenter symboliquement des ensembles infinis de vecteurs d'ent...
peer reviewedInteruniversity Attraction Poles program MoVES; Grant 2.4530.02; ANR-06-SETI-001 AVERIS
This article considers finite-automata-based algorithms for handling linear arithmetic with both rea...
This paper introduces a finite-automata based representation of Presburger arithmetic definable set...
In this paper we discuss efficient symbolic representations for infinite-state systems specified usi...
In this thesis, we study and answer several questions concerning recognizability of integer sets by ...
The Number Decision Diagram (NDD) has recently been introduced as a powerful representation system ...
AbstractIt has been known for a long time that the sets of integer vectors that are recognizable by ...
peer reviewedIf read digit by digit, a n-dimensional vector of integers represented in base r can b...
Abstract. This paper studies the expressive power of finite-state automata recognizing sets of real ...
This article studies the expressive power of finite-state automata recognizing sets of real numbers ...
AbstractThis article studies the expressive power of finite-state automata recognizing sets of real ...
peer reviewedThis paper studies the expressive power of finite-state automata recognizing sets of re...
International audienceThe least significant digit first decomposition of integer vectors into words ...
Abstract This work studies the properties of finite automata recogniz-ing vectors with real componen...
Les automates finis permettent de représenter symboliquement des ensembles infinis de vecteurs d'ent...
peer reviewedInteruniversity Attraction Poles program MoVES; Grant 2.4530.02; ANR-06-SETI-001 AVERIS
This article considers finite-automata-based algorithms for handling linear arithmetic with both rea...
This paper introduces a finite-automata based representation of Presburger arithmetic definable set...
In this paper we discuss efficient symbolic representations for infinite-state systems specified usi...
In this thesis, we study and answer several questions concerning recognizability of integer sets by ...
The Number Decision Diagram (NDD) has recently been introduced as a powerful representation system ...