We study the dynamics of systems on networks from a linear algebraic perspective. The control theoretic concept of controllability describes the set of states that can be reached for these systems. Our main result says that controllability in the quantum sense, expressed by the Lie algebra rank condition, and controllability in the sense of linear systems, expressed by the controllability matrix rank condition, are equivalent conditions. We also investigate how the graph theoretic concept of a zero forcing set impacts the controllability property; if a set of vertices is a zero forcing set, the associated dynamical system is controllable. These results open up the possibility of further exploiting the analogy between networks, linear contro...
In this paper we investigate a relaxed concept of controllability, known in the literature as herdab...
The purpose of this paper is to provide a brief review of some recent developments in quantum feedba...
This paper presents a geometric study of controllability for discrete-time nonlinear systems. Variou...
We study the dynamics of systems on networks from a linear algebraic perspective. The control theore...
In this technical note, controllability of systems defined on graphs is discussed. We consider the p...
In this technical note, controllability of systems defined on graphs is discussed. We consider the p...
In this thesis, we study the controllability of networked single-input single-output linear time-in...
The property of controllability of quantum systems is explored, and conditions for controllability b...
The purpose of this paper is fourfold: i) First, a brief description of how finite dimensional model...
In this paper, we consider discrete time quantum walks on graphs with coin, focusing on the decentra...
An overview and synthesis of results and criteria for open-loop controllability of Hamiltonian quant...
The purpose of this paper is to present general algebraic methods for describing quantum networks. T...
Abstract: We study the controllability of a closed control-affine quantum system driven by two or mo...
The purpose of this paper is to provide a brief review of some recent developments in quantum feedba...
The problem of controllability of open quantum systems (i.e., quantum systems interacting with an en...
In this paper we investigate a relaxed concept of controllability, known in the literature as herdab...
The purpose of this paper is to provide a brief review of some recent developments in quantum feedba...
This paper presents a geometric study of controllability for discrete-time nonlinear systems. Variou...
We study the dynamics of systems on networks from a linear algebraic perspective. The control theore...
In this technical note, controllability of systems defined on graphs is discussed. We consider the p...
In this technical note, controllability of systems defined on graphs is discussed. We consider the p...
In this thesis, we study the controllability of networked single-input single-output linear time-in...
The property of controllability of quantum systems is explored, and conditions for controllability b...
The purpose of this paper is fourfold: i) First, a brief description of how finite dimensional model...
In this paper, we consider discrete time quantum walks on graphs with coin, focusing on the decentra...
An overview and synthesis of results and criteria for open-loop controllability of Hamiltonian quant...
The purpose of this paper is to present general algebraic methods for describing quantum networks. T...
Abstract: We study the controllability of a closed control-affine quantum system driven by two or mo...
The purpose of this paper is to provide a brief review of some recent developments in quantum feedba...
The problem of controllability of open quantum systems (i.e., quantum systems interacting with an en...
In this paper we investigate a relaxed concept of controllability, known in the literature as herdab...
The purpose of this paper is to provide a brief review of some recent developments in quantum feedba...
This paper presents a geometric study of controllability for discrete-time nonlinear systems. Variou...