This paper is concerned with linear time-invariant (LTI) sampled-data systems (by which we mean sampled-data systems with LTI generalised plants and LTI controllers) and studies their H-2 norms from the viewpoint of impulse responses and generalised H-2 norms from the viewpoint of the induced norms from L-2 to L infinity. A new definition of the H-2 norm of LTI sampled-data systems is first introduced through a sort of intermediate standpoint of those for the existing two definitions. We then establish unified treatment of the three definitions of the H-2 norm through a matrix function G(tau) defined on the sampling interval [0, h). This paper next considers the generalised H-2 norms, in which two types of the L infinity norm of the output ...
This paper develops exact, computable formulas for the frequency gain and L₂-induced norm of the sen...
Key Words--Sampled-data systems; digital control; induced operator norms; performance analysis; disc...
Caption title.Includes bibliographical references (p. 18-20).Yasuaki Oishi and Munther A. Dahleh
This paper is concerned with linear time-invariant (LTI) sampled-data systems (by which we mean samp...
This paper considers linear time-invariant (LTI) sampled-data systems and studies their generalized ...
This paper considers linear time-invariant (LTI) sampled-data systems and studies their generalized ...
This paper tackled the problem of characterizing the induced norm from L₂ to L∞ in single-input/sing...
This paper develops a generalized framework for computing the -induced norm of sampled-data systems,...
This paper is concerned with the Hankel operator and the Hankel norm of sampled-data systems. Even t...
In this paper, we explore H2 analysis techniques of general, not necessarily positive, discrete-time...
For a linear time invariant system, the infinity-norm of the transfer function can be used as a meas...
This paper studies computation of ℓ2[0, h] induced norms of finite-dimensional linear systems. The p...
In this paper, we consider a general linear interconnection of a continuous-time plant and a discret...
This paper provides a discretization method for computing the induced norm from L₂ to L∞ in single-i...
This paper is concerned with the Hankel operator of sampled-data systems. The Hankel operator is usu...
This paper develops exact, computable formulas for the frequency gain and L₂-induced norm of the sen...
Key Words--Sampled-data systems; digital control; induced operator norms; performance analysis; disc...
Caption title.Includes bibliographical references (p. 18-20).Yasuaki Oishi and Munther A. Dahleh
This paper is concerned with linear time-invariant (LTI) sampled-data systems (by which we mean samp...
This paper considers linear time-invariant (LTI) sampled-data systems and studies their generalized ...
This paper considers linear time-invariant (LTI) sampled-data systems and studies their generalized ...
This paper tackled the problem of characterizing the induced norm from L₂ to L∞ in single-input/sing...
This paper develops a generalized framework for computing the -induced norm of sampled-data systems,...
This paper is concerned with the Hankel operator and the Hankel norm of sampled-data systems. Even t...
In this paper, we explore H2 analysis techniques of general, not necessarily positive, discrete-time...
For a linear time invariant system, the infinity-norm of the transfer function can be used as a meas...
This paper studies computation of ℓ2[0, h] induced norms of finite-dimensional linear systems. The p...
In this paper, we consider a general linear interconnection of a continuous-time plant and a discret...
This paper provides a discretization method for computing the induced norm from L₂ to L∞ in single-i...
This paper is concerned with the Hankel operator of sampled-data systems. The Hankel operator is usu...
This paper develops exact, computable formulas for the frequency gain and L₂-induced norm of the sen...
Key Words--Sampled-data systems; digital control; induced operator norms; performance analysis; disc...
Caption title.Includes bibliographical references (p. 18-20).Yasuaki Oishi and Munther A. Dahleh