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Publications in Math-Net.Ru
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Optimal design of observations of a nonstationary problem of identifying an interface
Sib. Zh. Ind. Mat., 1:1 (1998), 5–20
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Generalized Lyapunov function in the oscillation theory
Matem. Mod., 7:5 (1995), 83
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The neutral manifold principle for finding a limit cycle
Differ. Uravn., 30:5 (1994), 905–907
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Detection of a limit cycle in the Liénard equation by means of generalized Lyapunov functions
Differ. Uravn., 28:9 (1992), 1635–1638
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Quadratic systems with limit cycles
Differ. Uravn., 28:8 (1992), 1459–1461
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Linear generalized Lyapunov functions and limit cycles
Differ. Uravn., 27:5 (1991), 777–781
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Integrating factors and limit cycles
Differ. Uravn., 26:3 (1990), 542–544
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Investigation of the existence and convexity of limit cycles by the method of generalized Lyapunov functions
Differ. Uravn., 25:2 (1989), 212–216
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Lyapunov functions and self-induced oscillations
Differ. Uravn., 23:4 (1987), 722–724
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The generalized principle of central symmetry
Differ. Uravn., 22:10 (1986), 1689–1693
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Finding a limit cycle in a system of differential equations describing a model of a periodic trimolecular chemical reaction
Differ. Uravn., 21:12 (1985), 2175–2177
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Annular domains that contain limit cycles
Differ. Uravn., 20:3 (1984), 408–413
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Application of generalized Ljapunov functions to the study of limit cycles on the plane
Differ. Uravn., 8:12 (1972), 2248–2250
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Limiting cycles of infinite multiplicity
Differ. Uravn., 1:4 (1965), 464–466
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