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Publications in Math-Net.Ru |
Citations |
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2014 |
1. |
S. V. Gusev, “Kalman–Popov–Yakubovich lemma for ordered fields”, Avtomat. i Telemekh., 2014, no. 1, 23–41 ; Autom. Remote Control, 75:1 (2014), 18–33 |
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2006 |
2. |
S. V. Gusev, A. L. Likhtarnikov, “Kalman-Popov-Yakubovich lemma and the $S$-procedure: A historical essay”, Avtomat. i Telemekh., 2006, no. 11, 77–121 ; Autom. Remote Control, 67:11 (2006), 1768–1810 |
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3. |
S. V. Gusev, “The Fenchel duality, $S$-procedure, and the Yakubovich–Kalman lemma”, Avtomat. i Telemekh., 2006, no. 2, 135–153 ; Autom. Remote Control, 67:2 (2006), 293–310 |
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1999 |
4. |
S. V. Gusev, S. L. Shishkin, “An algorithm for dividing ellipsoid as a method for solving systems of nonconvex inequalities”, Avtomat. i Telemekh., 1999, no. 7, 25–33 ; Autom. Remote Control, 60:7 (1999), 926–933 |
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1997 |
5. |
S. V. Gusev, “Minimax control of a linear plant with discrete time under moment
restrictions on the disturbances”, Dokl. Akad. Nauk, 353:4 (1997), 453–455 |
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1989 |
6. |
S. V. Gusev, “A finite converging algorithm of restoring the regression function and its use in adaptive control”, Avtomat. i Telemekh., 1989, no. 3, 99–108 ; Autom. Remote Control, 50:3 (1989), 367–374 |
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1980 |
7. |
S. V. Gusev, V. A. Yakubovich, “An algorithm for adaptive control of a manipulator robot”, Avtomat. i Telemekh., 1980, no. 9, 101–111 ; Autom. Remote Control, 41:9 (1981), 1268–1277 |
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Presentations in Math-Net.Ru |
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Organisations |
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