AbstractWe show that the set of realizations of a given dimension of a max-plus linear sequence is a finite union of polyhedral sets, which can be computed from any realization of the sequence. This yields an (expensive) algorithm to solve the max-plus minimal realization problem. These results are derived from general facts on rational expressions over idempotent commutative semirings: we show more generally that the set of values of the coefficients of a commutative rational expression in one letter that yield a given max-plus linear sequence is a finite union of polyhedral sets
Abstract: More than sixteen years after the beginning of a linear theory for certain discrete event ...
AbstractWe prove that the properties of a semiring K “to be without zero divisors”, and “to be regul...
International audienceLet $A(x)=A_0+x_1A_1+...+x_nA_n$ be a linear matrix, or pencil, generated by g...
International audienceWe show that the set of realizations of a given dimension of a max-plus linear...
AbstractWe show that the set of realizations of a given dimension of a max-plus linear sequence is a...
summary:We introduce rational semimodules over semirings whose addition is idempotent, like the max-...
Semi-linear sets, which are rational subsets of the monoid (Z^d,+), have numerous applications in th...
In Rothvoß (Math Program 142(1–2):255–268, 2013) it was shown that there exists a 0/1 polytope (a p...
The max-plus algebra defined with the set with two binary operations and , where , for all ...
AbstractWe show that the problem of determining if a given integer linear recurrent sequence has a z...
AbstractIn this paper semirings with an idempotent addition are considered. These algebraic structur...
AbstractIteration semi-rings are Conway semi-rings satisfying Conway’s group identities. We show tha...
AbstractWe give a direct algorithmic proof of the implication “A seminormal implies A[X] seminormal”
In this paper we show that the so-called array Fréchet problem in Probability/Statistics is (max, +)...
We define rationally additive semirings that are a generalization of (omega-)complete and (omega-)co...
Abstract: More than sixteen years after the beginning of a linear theory for certain discrete event ...
AbstractWe prove that the properties of a semiring K “to be without zero divisors”, and “to be regul...
International audienceLet $A(x)=A_0+x_1A_1+...+x_nA_n$ be a linear matrix, or pencil, generated by g...
International audienceWe show that the set of realizations of a given dimension of a max-plus linear...
AbstractWe show that the set of realizations of a given dimension of a max-plus linear sequence is a...
summary:We introduce rational semimodules over semirings whose addition is idempotent, like the max-...
Semi-linear sets, which are rational subsets of the monoid (Z^d,+), have numerous applications in th...
In Rothvoß (Math Program 142(1–2):255–268, 2013) it was shown that there exists a 0/1 polytope (a p...
The max-plus algebra defined with the set with two binary operations and , where , for all ...
AbstractWe show that the problem of determining if a given integer linear recurrent sequence has a z...
AbstractIn this paper semirings with an idempotent addition are considered. These algebraic structur...
AbstractIteration semi-rings are Conway semi-rings satisfying Conway’s group identities. We show tha...
AbstractWe give a direct algorithmic proof of the implication “A seminormal implies A[X] seminormal”
In this paper we show that the so-called array Fréchet problem in Probability/Statistics is (max, +)...
We define rationally additive semirings that are a generalization of (omega-)complete and (omega-)co...
Abstract: More than sixteen years after the beginning of a linear theory for certain discrete event ...
AbstractWe prove that the properties of a semiring K “to be without zero divisors”, and “to be regul...
International audienceLet $A(x)=A_0+x_1A_1+...+x_nA_n$ be a linear matrix, or pencil, generated by g...