Method of integral inequalities in the theory of stability of motion

1. N. V. Azbelev, The Chaplygin Problem, Author's Abstract of Candidate's Dissertation, Izhevsk (1962).

2. N. V. Azbelev and Z. B. Tsalyuk, “On integral inequalities. I,” Mat. Sb., No. 56, 325–342 (1962).

   Google Scholar 

3. E. A. Barbashin, Introduction to the Theory of Stability, Wolters-Noordhoff, Groningen (1970).

   Google Scholar 

4. N. N. Bogolyubov, “Oscilations,” in: Mechanics in the USSR in the Last Thirty Years [in Russian], Moscow (1950).

5. N. N. Bogolyubov and Yu. A. Mitropol'skii, Asymptotic Methods in the Theory of Nonlinear Oscillations, Hindustan Publishing Co. (1961).

6. E. A. Gorin, “Asymptotic properties of multinomial and algebraic functions of several variables,” Usp. Mat. Nauk,16, No. 1, 91–118 (1961).

   Google Scholar 

7. F. R. Gantmakher, The Theory of Matrices, Chelsea, New York (1959).

   Google Scholar 

8. V. I. Zubov, Methods of A. M. Lyapunov and Their Applications, Noordhoff, Groningen (1964).

   Google Scholar 

9. K. Kordyunyanu, “Application of differential inequalities to stability theory, Anal. Stiint. Univ. “Al. I. Cuza” Iasi, Sect. 1,6, 47 (1960).

   Google Scholar 

10. V. I. Kosolapov, “Stability of motion in the neutral case,” Dokl. Akad. Nauk UkrSSR, No. 1, 27–31 (1979).

    Google Scholar 

11. N. N. Krasovskii, Stability of Motion, Stanford Univ. Press (1963).

12. A. M. Lyapunov, Stability of Motion, Academic Press (1966).

13. I. G. Malkin, Theory of Stability of Motion, U. S. A. Oak Ridge, Tenn. (1958).

14. A. A. Martynyuk, “Finite stability of motion at an infinite time interval,” Mat. Fiz., No. 13, 55–59 (1972).

    Google Scholar 

15. A. A. Martynyuk, “Technical stability of motion in separated coordinates,” Prikl. Mekh.,8, No. 3, 87–91 (1972).

    Google Scholar 

16. A. A. Martynyuk, Technical Stability in Dynamics [in Russian], Tekhnika, Kiev (1973).

    Google Scholar 

17. A. A. Martynyuk, Stability of Motion of Complex Systems [in Russian], Naukova Dumka, Kiev (1975).

    Google Scholar 

18. A. A. Martynyuk, “Qualitative and numerical-analytic studies of stability of motion,” Prikl. Mekh.,13, No. 10, 87–93 (1977).

    Google Scholar 

19. A. A. Martynyuk, “Development of the Lyapunov function method in stability theory of complex systems,” Prikl. Mekh.,15, No. 10, 3–23 (1979).

    Google Scholar 

20. A. A. Martynyuk, “Integrodifferential inequalities in the theory of stability of motion,” Dokl. Akad. Nauk UkrSSR, No. 6, 529–532 (1976).

    Google Scholar 

21. A. A. Martynyuk and R. Gutovskii, Integral Inequalities and Stability of Motion [in Russian], Naukova Dumka, Kiev (1979).

    Google Scholar 

22. A. A. Martynyuk and S. D. Borisenko, “Technical stability of motion on an unbounded interval,” Mat. Fiz., No. 28, 25–34 (1980).

    Google Scholar 

23. A. A. Martynyuk and V. I. Kosopalov, “Stability of mechanical systems for the varying coupling model,” Prikl. Mekh.,14, No. 12, 125–128 (1978).

    Google Scholar 

24. A. A. Martynyuk and V. I. Kosopalov, “The comparison principle and the averaging method in the stability problem of nonasymptotic stable motion with constantly acting perturbations,” Preprint No. 78.33, Inst. Mat. Akad. Nauk UkrSSR, Kiev (1978).

    Google Scholar 

25. A. A. Martynyuk and A. Yu. Obolenskii, “Study of stability of autonomous comparison systems,” Preprint No. 78.28, Inst. Mat. Akad. Nauk UkrSSR, Kiev (1978).

    Google Scholar 

26. V. M. Matrosov, “The theory of stability of motion,” Prikl. Mat. Mekh.,26, No. 6, 992–1002 (1962).

    Google Scholar 

27. V. M. Matrosov, “The method of Lyapunov vector functions in systems with inverse coupling,” Avtom. Telemekh., No. 9, 63–75 (1972).

    Google Scholar 

28. V. M. Matrosov, “The method of Lyapunov vector functions in analysis of complex systems with distributed parameters,” Avtom. Telemekh., No. 1, 5–22 (1973).

    Google Scholar 

29. G. I. Mel'nikov, “Several problems of the direct Lyapunov method,” Dokl. Akad. Nauk SSSR,110, No. 3, 326–329 (1956).

    Google Scholar 

30. G. I. Mel'nikov, Dynamics of Nonlinear Mechanical and Electromechanical Systems [in Russian], Mashinostroenie, Moscow (1975).

    Google Scholar 

31. Mechanics in the USSR in the Last Fifty Years [in Russian], Nauka, Moscow (1968).

32. Yu. A. Mitropol'skii and V. I. Zubov, Prikl. Mekh.,15, No. 5, 106 (1979). Also in [17].

    Google Scholar 

33. Yu. A. Mitropol'skii and A. A. Martynyuk, “Several problems in the comparison method in nonlinear mechanics,” Ukr. Mat. Zh.,30, No. 6, 823–829 (1978).

    Google Scholar 

34. A. S. Oziraner, “Stability of motion in the linear approximation,” Prikl. Mat. Mekh.,41, No. 3, 413–421 (1977).

    Google Scholar 

35. K. Persidskii, Selected Works [in Russian], Vol. 1, Nauka, Alma-Ata (1976).

    Google Scholar 

36. V. V. Rumyantsev, “Stability of motion in part of the variables,” Vestn. Mosk. Univ., Ser. Mat., Mekh. Fiz., Khim., Astron., No. 4, 9–14 (1957).

    Google Scholar 

37. L. Khatvani, “Application of differential inequalities to stability theory,” Vestn. Mosk. Univ. Ser. Mat., Mekh., No. 3, 83–89 (1975).

    Google Scholar 

38. Z. B. Tsalyuk, “Volterra integral equations,” in: Mathematical Analysis [in Russian], Vol. 15, Itogi Nauki, Moscow (1977).

    Google Scholar 

39. S. A. Chaplygin, “New method of approximate integration of differential equations,” in: Selected Works [in Russian], Nauka, Moscow (1976).

    Google Scholar 

40. N. G. Chetaev, “Stability of motion,” in: Works in Analytic Mechanics [in Russian], Akad. Nauk SSSR, Moscow (1962).

    Google Scholar 

41. P. R. Beesack, “On Lakshmikantham's comparison method for Gronwall inequalities,” Ann. Pol. Mat.,35, No. 2, 187–222 (1977).

    Google Scholar 

42. J. M. Bownds and J. M. Cushing, “Some stability theorems for systems of Volterra integral equations,” Appl. Anal.,5, No. 1, 65–77 (1975).

    Google Scholar 

43. J. M. Cushing, “Strong stability of perturbed systems of Volterra integral equations,” Math. Syst. Theory,7, No. 4, 360–366 (1974).

    Google Scholar 

44. J. M. Cushing, “Stability of perturbed Volterra integral equations,” J. Math. Anal. Appl.,50, 325–340 (1975).

    Google Scholar 

45. T. H. Gronwall, “Note on the derivatives with respect to a parameter of the solutions of a system of differential equations,” Ann. Math.,20, No. 2, 292–296 (1919).

    Google Scholar 

46. R. Gutowski, Ordinary Differential Equations [in Polish], Wydawnictwa Naukowo-Techniczne, Warsaw (1971).

    Google Scholar 

47. V. Lakshikantham, “A variation of constants formula and Bellman-Gronwall-Reid inequalities,” J. Math. Anal. Appl., No. 41, 199–204 (1973).

    Google Scholar 

48. A. A. Martynyuk, “Technical stability of nonlinear and control systems,” Nonlin. Vibr. Probl., No. 19, 21–84 (1979).

    Google Scholar 

49. M. Rama Mohana Rao, “A note on an integral inequality,” J. Indian Math. Soc.,27, No. 2, 65–71 (1963).

    Google Scholar 

50. N. Ronche, P. Habets, and M. Laloy, Stability Theory by Lyapunov's Direct Method, Springer-Verlag, New York (1977).

    Google Scholar 

51. T. Wazewski, “A topological principle of examining the asymptotic behavior of integrals of ordinary differential equations,” Ann. Pol. Math., No. 20, 279–313 (1947).

    Google Scholar 

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