Popov's Method and its Subsequent Development*
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Cited by (44)
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2023, Nonlinear Analysis: Hybrid SystemsLeonov's nonlocal reduction technique for nonlinear integro-differential equations
2020, IFAC-PapersOnLineStability analysis by dynamic dissipation inequalities: On merging frequency-domain techniques with time-domain conditions
2018, Systems and Control LettersCitation Excerpt :However, for the much more powerful dynamic multipliers in [1], the connection between the related so-called soft (infinite-horizon) IQCs and dissipativity theory has only been demonstrated for specialized cases in [20–25]. Relations of IQCs to Yakubovich’s absolute stability framework and classical multiplier theory are discussed, e.g., in [26–32]. The purpose of this paper is to present a novel IQC theorem based on the notion of finite-horizon IQCs with a terminal cost.
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This work was supported by the French-Russian A.M. Liapunov Institute, grant 00-04.
Copyright © 2002 European Control Association (EUCA). Published by Elsevier Ltd. All rights reserved.