International audienceWeighted automata over the max-plus semiring S are closely related to finitely generated semigroups of matrices over S. In this paper, we use results in automata theory to study two quantities associated with sets of matrices: the joint spectral radius and the ultimate rank. We prove that these two quantities are not computable over the tropical semiring, i.e. there is no algorithm that takes as input a finite set of matrices M and provides as output the joint spectral radius (resp. the ultimate rank) of M. On the other hand, we prove that the joint spectral radius is nevertheless approximable and we exhibit restricted cases in which the joint spectral radius and the ultimate rank are computable. To reach this aim, we ...
In this paper, we introduce a procedure for approximating the joint spectral radius of a finite set ...
Abstract. We investigate the problem of extracting the k best strings from a non-deterministic weigh...
AbstractThis paper concerns two notions of rank of matrices over semirings: semiring rank and column...
International audienceWeighted automata over the max-plus semiring S are closely related to finitely...
Abstract. Distance automata are automata weighted over the semiring (N∪{∞},min,+) (the tropical semi...
International audienceA tropical matrix is a matrix defined over the max-plus semiring. For such mat...
AbstractThe notion of spectral radius of a set of matrices is a natural extension of spectral radius...
The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...
In the paper, we generalize an algorithm and some related results by Mohri [25] for deter-minization...
In this paper the problem of the computation of the joint spectral radius of a finite set of matrice...
AbstractIn this paper the problem of the computation of the joint spectral radius of a finite set of...
AbstractThe max-Łukasiewicz semiring is defined as the unit interval [0,1] equipped with the arithme...
Distance automata are automata weighted over the semiring (N∪ {∞}, min,+) (the tropical semiring). S...
Rank of a real matrix can be defined in many equivalent way. It is interesting that the rank of a ma...
In this paper, an upper bound for the CP-rank of a matrix over a tropical semiring is obtained, acco...
In this paper, we introduce a procedure for approximating the joint spectral radius of a finite set ...
Abstract. We investigate the problem of extracting the k best strings from a non-deterministic weigh...
AbstractThis paper concerns two notions of rank of matrices over semirings: semiring rank and column...
International audienceWeighted automata over the max-plus semiring S are closely related to finitely...
Abstract. Distance automata are automata weighted over the semiring (N∪{∞},min,+) (the tropical semi...
International audienceA tropical matrix is a matrix defined over the max-plus semiring. For such mat...
AbstractThe notion of spectral radius of a set of matrices is a natural extension of spectral radius...
The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...
In the paper, we generalize an algorithm and some related results by Mohri [25] for deter-minization...
In this paper the problem of the computation of the joint spectral radius of a finite set of matrice...
AbstractIn this paper the problem of the computation of the joint spectral radius of a finite set of...
AbstractThe max-Łukasiewicz semiring is defined as the unit interval [0,1] equipped with the arithme...
Distance automata are automata weighted over the semiring (N∪ {∞}, min,+) (the tropical semiring). S...
Rank of a real matrix can be defined in many equivalent way. It is interesting that the rank of a ma...
In this paper, an upper bound for the CP-rank of a matrix over a tropical semiring is obtained, acco...
In this paper, we introduce a procedure for approximating the joint spectral radius of a finite set ...
Abstract. We investigate the problem of extracting the k best strings from a non-deterministic weigh...
AbstractThis paper concerns two notions of rank of matrices over semirings: semiring rank and column...