AbstractA combinatorial analogue of the dynamical system theory is developed in a matroid-theoretic framework. The combinatorial dynamical system is described by a combinatorial analogue of the state-space equation xk + 1 =Axk + Buk; the matrices A and B are to be replaced by bimatroids (or linking systems). Related concepts such as controllability are defined and their fundamental properties are investigated. In particular, a sequence of matroids {Rk} determined by a “stationary iteration” Rk + 1 =A *Rk∨N is considered, whereA * Rk is the matroid induced fromRk by a bimatroidA, andN is a matroid
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
In this paper we present an approach to linear dynamical systems which combines the positive feature...
Abstract We introduce and study, from a combinatorial-topological viewpoint, some semigroups of cont...
AbstractA combinatorial analogue of the dynamical system theory is developed in a matroid-theoretic ...
AbstractThis paper is a unified presentation of recent results obtained by the author on the structu...
The main purpose of this paper is to promote the study of computational aspects, primarily the conve...
Dynamical systems are mathematical structures whose aim is to describe the evolution of an arbitrary...
As initially suggested by E. Sontag, it is possible to approximate an arbitrary nonlinear system by ...
The theory ofmatriods consists of generalization of basic notions of linear algebra likedependence, ...
AbstractGraphical methods provide useful tools to study the structure of systems. The bond-graph app...
We introduce and study, from a combinatorial-topological viewpoint, some semigroups of continuous no...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
AbstractWith the help of the concept of a linking system, theorems relating matroids with bipartite ...
This book provides the mathematical foundations of networks of linear control systems, developed fro...
With the help of the concept of a linking system, theorems relating matroids with bipartite graphs a...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
In this paper we present an approach to linear dynamical systems which combines the positive feature...
Abstract We introduce and study, from a combinatorial-topological viewpoint, some semigroups of cont...
AbstractA combinatorial analogue of the dynamical system theory is developed in a matroid-theoretic ...
AbstractThis paper is a unified presentation of recent results obtained by the author on the structu...
The main purpose of this paper is to promote the study of computational aspects, primarily the conve...
Dynamical systems are mathematical structures whose aim is to describe the evolution of an arbitrary...
As initially suggested by E. Sontag, it is possible to approximate an arbitrary nonlinear system by ...
The theory ofmatriods consists of generalization of basic notions of linear algebra likedependence, ...
AbstractGraphical methods provide useful tools to study the structure of systems. The bond-graph app...
We introduce and study, from a combinatorial-topological viewpoint, some semigroups of continuous no...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
AbstractWith the help of the concept of a linking system, theorems relating matroids with bipartite ...
This book provides the mathematical foundations of networks of linear control systems, developed fro...
With the help of the concept of a linking system, theorems relating matroids with bipartite graphs a...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
In this paper we present an approach to linear dynamical systems which combines the positive feature...
Abstract We introduce and study, from a combinatorial-topological viewpoint, some semigroups of cont...