Abstract We introduce a new construction involving Rees matrix semigroups and max-plus algebras that is very convenient for generating sets of centroids. We describe completely all optimal sets of centroids for all Rees matrix semigroups without any restrictions on the sandwich matrices. © 2013 Australian Mathematical Publishing Association Inc
A semigroup is simply a set with an associative binary operation; computational semigroup theory is ...
AbstractThe maximal monoids of the form FSF are studied, where F is a nonnegative idempotent matrix ...
Abstract. This paper is devoted to a combinatorial problem for incidence semirings, which can be vie...
Max-plus algebras and more general semirings have many useful applications and have been actively in...
This paper continues the investigation of semigroup constructions motivated by applications in data ...
The aim of the present article is to obtain a theoretical result essential for applications of combi...
The present article continues the investigation of constructions essential for applications of combi...
The max-plus algebra is well known and has useful applications in the investigation of discrete even...
The max-plus algebra is well known and has useful applications in the investigation of discrete even...
This article continues the investigation of matrix constructions motivated by their applications to ...
AbstractWe investigate the action of semigroups of d×d matrices with entries in the max-plus semifie...
We show that the answer to the Burnside problem is positive for semigroups of matrices with entries ...
Recent research has motivated the investigation of the weights of ideals in semiring constructions b...
This paper is devoted to a combinatorial problem for incidence semirings, which can be viewed as set...
Computational semigroup theory is concerned with developing and implementing algorithms for determin...
A semigroup is simply a set with an associative binary operation; computational semigroup theory is ...
AbstractThe maximal monoids of the form FSF are studied, where F is a nonnegative idempotent matrix ...
Abstract. This paper is devoted to a combinatorial problem for incidence semirings, which can be vie...
Max-plus algebras and more general semirings have many useful applications and have been actively in...
This paper continues the investigation of semigroup constructions motivated by applications in data ...
The aim of the present article is to obtain a theoretical result essential for applications of combi...
The present article continues the investigation of constructions essential for applications of combi...
The max-plus algebra is well known and has useful applications in the investigation of discrete even...
The max-plus algebra is well known and has useful applications in the investigation of discrete even...
This article continues the investigation of matrix constructions motivated by their applications to ...
AbstractWe investigate the action of semigroups of d×d matrices with entries in the max-plus semifie...
We show that the answer to the Burnside problem is positive for semigroups of matrices with entries ...
Recent research has motivated the investigation of the weights of ideals in semiring constructions b...
This paper is devoted to a combinatorial problem for incidence semirings, which can be viewed as set...
Computational semigroup theory is concerned with developing and implementing algorithms for determin...
A semigroup is simply a set with an associative binary operation; computational semigroup theory is ...
AbstractThe maximal monoids of the form FSF are studied, where F is a nonnegative idempotent matrix ...
Abstract. This paper is devoted to a combinatorial problem for incidence semirings, which can be vie...