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CDC
2008
IEEE
2008
IEEE
New results in optimal quadratic supply rates
— This paper concerns studying dissipativity of a system with supply rates that depend on one or more parameters. We show that suitable choice of supply rate turns out to make dissipativity equivalent to traditional gain/phase margin conditions for stability. Further, the well-known circle criterion corresponds to a different supply rate, and here optimizing the supply rate is nothing but finding the largest circle such that circle criterion implies absolute stability for time-varying nonlinearities. L∞-control is another example of dissipativity with respect to a relevant supply rate, and here we show that, in fact, improper L∞-controllers are easily dealt with using our approach (unlike the standard state space methods). We formulate and prove necessary and sufficient conditions for L∞-control, and then conclude that optimal controllers always exist (under suboptimal solvability conditions).
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| Added | 29 May 2010 |
| Updated | 29 May 2010 |
| Type | Conference |
| Year | 2008 |
| Where | CDC |
| Authors | Debasattam Pal, Subhrajit Sinha, Madhu N. Belur, Harish K. Pillai |
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