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| Name | Last modified | Size | Description |
|---|---|---|---|---|
| Parent Directory | - | ||
| ECC97.ps | 2010-07-15 10:06 | 283K | |
| README.html | 2010-07-15 10:06 | 959 | |
| ecc97.pdf | 2010-07-15 10:06 | 206K | |
Abstract.
This paper examines the limitations imposed by Right Half Plane (RHP)
zeros and poles in multivariable feedback systems. The main result is
to provide lower bounds on || WXV (s) || where X is S, SI,
T or TI (sensitivity and complementary sensitivity).
Previously derived lower bounds on the H-infinity-norm of S and T are
thus generalized to the case with matrix-valued weights, including
bounds for reference tracking and disturbance rejection. Furthermore,
new bounds which quantify the minimum input usage for stabilization in
the presence of measurement noise and disturbances are derived.