Linear time-varying H2-optimal control of sampled-data systems

Alntmet--The sampled-data H® optimal control problem is studied for time-varying systems. The problem consists of finding all sampled-data controllers with a piece-wise constant control signal for which the L2-induced norm from the continuous-time disturbance to the continuous-time output is less th

This paper solves the digital stationary optimal control problem in the case of linear stochastic continuoustime systems, long-term average integral criteria, complete state information and where the sampling periods are independent identically distributed stochastic variables, using the notions of

The sampled-dam H® control problem, which consists of designing a sampled-dam controller such that the L2-induced norm from the continuous-time input to the continuous-time output is less than a given value, can be solved via a discrete system representation.

State analysis and optimization of time-varying systems via Haar wavelets are proposed in this paper. Based upon some useful properties of Haar functions, a special product matrix and a related coefficient matrix are applied to solve the time-varying systems first. Then the backward integration is i

A method of jkite series expansion using discrete Legendre orthogonal polynomials (DLOP's) is proposed for the fmite-time optimal control of time-varying discrete systems with a quadratic performance index. Computational algorithms are derivedfor solving two-point boundary-value canonical state equ