We present a numerical approach to compute a minimal periodic state-space realization of a transfer-function matrix corresponding to a lifted state-space representation. The proposed method determines a realization with time-varying state dimensions by using exclusively orthogonal transformations. The new method is numerically reliable, computationally efficient and thus well suited for robust software implementations
Practical applications in signals and systems often deal with lifted models of periodic digital filt...
summary:For linear periodic discrete-time systems the analysis of the model error introduced by a tr...
AbstractIn this paper, we consider the partially known input-output response of a linear periodic mo...
We present a numerical approach to evaluate the transfer function matrices of a periodic system corr...
Abstract- Minimal dimension dynamic covers play an important role in solving the structural synthesi...
We propose balancing related numerically reliable methods to compute minimal realizations of linear ...
AbstractGiven an input-output periodic application, we prove that a periodic realization is minimal ...
Subsampling of a linear periodically time-varying system results in a collection of linear time-inva...
Abstract: We propose computationally ecient and numerically reliable algorithms to compute minimal r...
AbstractGiven an appropriate collection of periodic rational matrices, we characterize when it has a...
We apply a Floquet-like theory to linear discrete-time periodic systems, and present an algorithm to...
The problem of minimal state space realization of two-dimensional systems is considered. The approac...
AbstractThis paper deals with the existence and associated realization theory of skew polynomial fra...
AbstractWe give a survey of the results in connection with the minimal state-space realization probl...
summary:In this paper, the problem of obtaining a periodic model in state-space form of a linear pro...
Practical applications in signals and systems often deal with lifted models of periodic digital filt...
summary:For linear periodic discrete-time systems the analysis of the model error introduced by a tr...
AbstractIn this paper, we consider the partially known input-output response of a linear periodic mo...
We present a numerical approach to evaluate the transfer function matrices of a periodic system corr...
Abstract- Minimal dimension dynamic covers play an important role in solving the structural synthesi...
We propose balancing related numerically reliable methods to compute minimal realizations of linear ...
AbstractGiven an input-output periodic application, we prove that a periodic realization is minimal ...
Subsampling of a linear periodically time-varying system results in a collection of linear time-inva...
Abstract: We propose computationally ecient and numerically reliable algorithms to compute minimal r...
AbstractGiven an appropriate collection of periodic rational matrices, we characterize when it has a...
We apply a Floquet-like theory to linear discrete-time periodic systems, and present an algorithm to...
The problem of minimal state space realization of two-dimensional systems is considered. The approac...
AbstractThis paper deals with the existence and associated realization theory of skew polynomial fra...
AbstractWe give a survey of the results in connection with the minimal state-space realization probl...
summary:In this paper, the problem of obtaining a periodic model in state-space form of a linear pro...
Practical applications in signals and systems often deal with lifted models of periodic digital filt...
summary:For linear periodic discrete-time systems the analysis of the model error introduced by a tr...
AbstractIn this paper, we consider the partially known input-output response of a linear periodic mo...