Abstract
The computation of the H/sub /spl infin// norms of a class of finite-dimensional linear continuous-time periodic (FDLCP) systems is discussed. By a staircase truncation on the frequency response operators of FDLCP systems, asymptotic LTI continuous-time models are established, based on which the H/sub /spl infin// norms can be estimated in the asymptotic sense, and thus the Hamiltonian test is recovered in the FDLCP setting. From this asymptotic Hamiltonian test, a modified bisection algorithm is developed for the H/sub /spl infin// norm estimation. It is also considered to implement the algorithm via approximate modeling, which is numerically implementable in most practical FDLCP systems.
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