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Line 66: * The [[Kalman's conjecture]]. Graphically, these conjectures can be interpreted in terms of graphical restrictions on the graph of Φ(''y'') ''x'' ''y'' or also on the graph of ''d''Φ/''dy'' ''x'' Φ/''y''.<ref>{{Cite journal\|~~last~~last1=Naderi\|~~first~~first1=T.\|last2=Materassi\|first2=D.\|last3=Innocenti\|first3=G.\|last4=Genesio\|first4=R.\|date=2019\|title=Revisiting Kalman and Aizerman Conjectures via a Graphical Interpretation\|journal=IEEE Transactions on Automatic Control\|volume=64\|issue=2\|pages=670–682\|doi=10.1109/TAC.2018.2849597\|s2cid=59553748 \|issn=0018-9286}}</ref> There are counterexamples to Aizerman's and Kalman's conjectures such that nonlinearity belongs to the sector of linear stability and unique stable equilibrium coexists with a stable periodic solution—[[hidden oscillation]]. There are two main theorems concerning the Lur'e problem which give sufficient conditions for absolute stability: Line 92: == Further reading == {{refbegin}} {{cite journal \|~~first~~first1=A. I. \|~~last~~last1=Lur'e \|first2=V. N. \|last2=Postnikov \|title=К теории устойчивости регулируемых систем \|trans-title=On the Theory of Stability of Control Systems \|journal=Prikladnaya Matematika I Mekhanika \|volume=8 \|issue=3 \|year=1944 \|pages=246–248 \|language=Russian }} {{cite book \|first=M. \|last=Vidyasagar \|title=Nonlinear Systems Analysis \|edition=2nd \|publisher=Prentice Hall \|___location=Englewood Cliffs \|year=1993 \|isbn=978-0-13-623463-0 }} {{cite book \|first=A. \|last=Isidori \|title=Nonlinear Control Systems \|edition=3rd \|publisher=Springer \|___location=Berlin \|year=1995 \|isbn=978-3-540-19916-8 }} {{cite book \|first=H. K. \|last=Khalil \|title=Nonlinear Systems \|edition=3rd \|publisher=Prentice Hall \|___location=Upper Saddle River \|year=2002 \|isbn=978-0-13-067389-3 }} {{cite book \|~~first~~first1=B. \|~~last~~last1=Brogliato \|first2=R. \|last2=Lozano \|first3=B. \|last3=Maschke \|first4=O. \|last4=Egeland \|title=Dissipative Systems Analysis and Control \|publisher=Springer \|___location=London \|edition=3rd \|year=2020 }} {{cite journal \|author1=Leonov G.A. \|author2=Kuznetsov N.V. \| year = 2011 Line 105: \| url = http://www.math.spbu.ru/user/nk/PDF/2011-DAN-Absolute-stability-Aizerman-problem-Kalman-conjecture.pdf \| doi = 10.1134/S1064562411040120 \| issue = 1\|s2cid=120692391 }} {{cite journal \|author1=Bragin V.O. \|author2=Vagaitsev V.I. \|author3=Kuznetsov N.V. \|author4=Leonov G.A. \| year = 2011 Line 114: \| url = http://www.math.spbu.ru/user/nk/PDF/2011-TiSU-Hidden-oscillations-attractors-Aizerman-Kalman-conjectures.pdf \| doi = 10.1134/S106423071104006X \| issue = 5\|s2cid=21657305 }} {{cite journal \| author = Leonov G.A., Kuznetsov N.V.

Nonlinear control: Difference between revisions