Mixed H^2/H^∞ Estimation: Preliminary Analytic Characterization And A Numerical Solution
- Creators
- Halder, B.
- Hassibi, B.
- Kailath, T.
Abstract
We introduce and motivate the problem of mixed H^2/H∞ estimation by studying the stochastic and deterministic approaches of H^2 and H^∞ estimation. Mixed H^2/H^∞ estimators have the property that they have the best average performance over all estimators that achieve a certain worst-case performance bound. They thus allow a tradeoff between average and worst-case performances. In the finite horizon case, we obtain a numerical solution (based on convex optimization methods) for the optimal mixed H^2/H^∞ estimator. We also give some analytic characterizations, both on this optimal solution, and on the set of all estimators achieving a guaranteed worst-case bound. A numerical example is also provided.
Additional Information
© 1996 IFAC. This researchwas supportedby theAdvanced ResearchProjects Agency of the Department of Defense monitored by the Air Force Office of Scientific Research under Contract F49620-93-1-0085.Attached Files
Submitted - Mixed_..._Estimation-_Preliminary_Analytic_Characterization_And_A_Numerical_Solution.pdf
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Additional details
- Eprint ID
- 54920
- Resolver ID
- CaltechAUTHORS:20150218-075106274
- Air Force Office of Scientific Research (AFOSR)
- F49620-93-1-0085
- Created
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2015-03-04Created from EPrint's datestamp field
- Updated
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2019-10-03Created from EPrint's last_modified field