This paper deals with the problem of obtaining a stable triangular approximation for a linear, square, stable, discrete-time MIMO system. We solve this problem through an analytic procedure that yields an explicit solution of a convex optimization problem. The optimized quantity is the L2 norm of the relative modelling error. An interesting feature of the proposed methodology is that, if the MIMO system has nonminimum phase zeros near the stability boundary, then the derived approximation has, at least, a set of zeros close to them. The usefulness of our result comes mainly from its use as nominal model in triangular controller design procedures based on a triangular plant model
<正>The problem of checking robust D-stability of multi-in and multi-out (MIMO) systems was stu...
This paper considers the problem of designing near-optimal finite-dimensional compensators for stabl...
This paper provides sufficient conditions for robust stability of a multivariable interval feedback ...
This paper deals with the problem of obtaining a stable triangular approximation for a linear, squar...
This paper proposes a design methodology of triangular controllers for full MIMO stable plants. The ...
An extension of backstepping to a class of multivariable minimum-phase nonlinear systems is proposed...
This paper is about optimal control problems in which the controller must satisfy sparsity structure...
In this paper, the weighted sensitivity minimization problem of multivariable linear time-invariant,...
This thesis treats the following problem: Given a multivariable linear time-invariant plant, we want...
The problem of checking robust D-stability of multi-in and multi-out (MIMO) systems was studied. Thr...
Abstract. The problem of output feedback stabilizability of multi-input-multi-output (MIMO) multidim...
The purpose of this paper is to study stabilization problem of linear time-invariant systems subject...
Stability is a crucial property in the study of dynamical systems. We focus on the problem of enforc...
In this paper we consider a MIMO asymptotically stable linear plant. For such a system the classical...
Abstract: In this paper we present a methodology for the feedforward minimum-time regulation of Mult...
<正>The problem of checking robust D-stability of multi-in and multi-out (MIMO) systems was stu...
This paper considers the problem of designing near-optimal finite-dimensional compensators for stabl...
This paper provides sufficient conditions for robust stability of a multivariable interval feedback ...
This paper deals with the problem of obtaining a stable triangular approximation for a linear, squar...
This paper proposes a design methodology of triangular controllers for full MIMO stable plants. The ...
An extension of backstepping to a class of multivariable minimum-phase nonlinear systems is proposed...
This paper is about optimal control problems in which the controller must satisfy sparsity structure...
In this paper, the weighted sensitivity minimization problem of multivariable linear time-invariant,...
This thesis treats the following problem: Given a multivariable linear time-invariant plant, we want...
The problem of checking robust D-stability of multi-in and multi-out (MIMO) systems was studied. Thr...
Abstract. The problem of output feedback stabilizability of multi-input-multi-output (MIMO) multidim...
The purpose of this paper is to study stabilization problem of linear time-invariant systems subject...
Stability is a crucial property in the study of dynamical systems. We focus on the problem of enforc...
In this paper we consider a MIMO asymptotically stable linear plant. For such a system the classical...
Abstract: In this paper we present a methodology for the feedforward minimum-time regulation of Mult...
<正>The problem of checking robust D-stability of multi-in and multi-out (MIMO) systems was stu...
This paper considers the problem of designing near-optimal finite-dimensional compensators for stabl...
This paper provides sufficient conditions for robust stability of a multivariable interval feedback ...