a state of the art survey of computational methods for periodic systems has been presented (Varga and Van Dooren, 2001). This contribution continues this survey by presenting the main achievements in this eld since 2001. Besides many foreseen developments mentioned in 2001 as open problems, important new developments took place as general algorithms for analysis of periodic descriptor systems, solution of periodic Riccati equations, or computational methods for continuous-time periodic systems
1The paper discusses computationally efficient NLMS and RLS algorithms for perfect and imperfect per...
The theory of modern dynamical systems dates back to 1890 with studies by Poincaré on celestial mec...
summary:The paper is divided in two parts. In the first part a deep investigation is made on some sy...
Linear periodic systems originate in various control fields involving periodic phenomena. In the beg...
A numerically reliable state space algorithm is proposed for computing inner-outer factorizations o...
Abstract: We propose computationally ecient and numerically reliable algorithms to compute minimal r...
This dissertation concerns the model reduction of linear periodic descriptor systems both in continu...
Periodic control systems are of interest in many engineering and mechanical research. Many important...
this paper to illustrate this fact are: the optimal periodic LQG control with state feedback and wit...
In this paper, we review some recent results on the dynamics of semi-dynamical systems generated by ...
This thesis presents new numerical methods for solving differential equations with periodicity. Spec...
AbstractA unified presentation of periodicity and ultimate periodicity of D0L systems is given. Boun...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
We propose several dictionary representations for periodic signals and use them for estimating their...
The Poincaré–Lindstedt method in perturbation theory is used to compute periodic solutions in pertur...
1The paper discusses computationally efficient NLMS and RLS algorithms for perfect and imperfect per...
The theory of modern dynamical systems dates back to 1890 with studies by Poincaré on celestial mec...
summary:The paper is divided in two parts. In the first part a deep investigation is made on some sy...
Linear periodic systems originate in various control fields involving periodic phenomena. In the beg...
A numerically reliable state space algorithm is proposed for computing inner-outer factorizations o...
Abstract: We propose computationally ecient and numerically reliable algorithms to compute minimal r...
This dissertation concerns the model reduction of linear periodic descriptor systems both in continu...
Periodic control systems are of interest in many engineering and mechanical research. Many important...
this paper to illustrate this fact are: the optimal periodic LQG control with state feedback and wit...
In this paper, we review some recent results on the dynamics of semi-dynamical systems generated by ...
This thesis presents new numerical methods for solving differential equations with periodicity. Spec...
AbstractA unified presentation of periodicity and ultimate periodicity of D0L systems is given. Boun...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
We propose several dictionary representations for periodic signals and use them for estimating their...
The Poincaré–Lindstedt method in perturbation theory is used to compute periodic solutions in pertur...
1The paper discusses computationally efficient NLMS and RLS algorithms for perfect and imperfect per...
The theory of modern dynamical systems dates back to 1890 with studies by Poincaré on celestial mec...
summary:The paper is divided in two parts. In the first part a deep investigation is made on some sy...