Abstract
In the preceding chapter we investigated asymptotic solutions of smooth systems of differential equations as t → ± 0, or as t → ± ∞, where it wasn’t stipulated that the desired solutions be located in a neighborhood of a critical point.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Literature
Arnol’d, V.I.: Small denominators and problems of stability of motion in classical and celestial mechanics. Russ. Math. Surv. 18(6), 85–191 (1963). Translated from: Usp. Mat. Nauk. 18(6) (114), 91–192 (1963)
Arnol’d, V.I.: Algebraic unsolvability of the problem of Lyapunov stability and the problem of the topological classification of the singular points of an analytic system of differential equation. Funct. Anal. Appl. 4, 173–180 (1970). Translated from: Funkts. Anal. Prilozh. 4(3), 1–9 (1970)
Arnold, V.I.: Mathematical Methods of Classical Mechanics. Springer, New York (1978). Publication source: Nauka, Moscow (1974)
Arnold, V.I.: Geometrical Methods in the Theory of Ordinary Differential Equations. Springer, New York (1988). Publication source: Nauka, Moscow (1978)
Arnold, V.I., Kozlov, V.V., Neishtadt, A.I.: Mathematical aspects of classical and celestial mechanics. In: Encyclopedia of Mathematical Sciences, vol. 3. Springer, Berlin (1993). Tranlated from: Itogi Nauki i Tekhniki in series Contemporary Problems in Mathematics. Fundamental Directions, vol. 1 (1985)
Bardin, B.S.: On the motion of satellites, asymptotic to their regular precession (Russian). Kosmich. Isled. 29(6), 822–827 (1991)
Bardin, B.S.: Asymptotic solutions of Hamiltonian systems in the case of first-order resonance. J. Appl. Mech. 55(4), 469–474 (1991). Translated from: Prikl. Mat. Mekh. 55(4), 587–593 (1991)
Belaga, E.G.: On the reducibility of a system of ordinary differential equations in the neighborhood of a conditionally periodic motion. Sov. Math. Dokl. 3(2), 360–364 (1962). Translated from: Dokl. Akad. Nauk. SSSR 143, 255–258 (1962)
Belitskiy, G.R.: Normal Forms, Invariants and Local Mappings (Russian). Naukova Dumka, Kiev (1979). MR 537763, Zbl 0479.58001
Birkhoff, G.D.: Dynamical Systems. American Mathematical Society, Providence (1966)
Bogolyubov, N.N., Mitropolskiy, Y.O., Smoylenko, A.M.: Methods of Accelerated Convergence in Nonlinear Mechanics. Springer, New York (1976). Publication source: Naukova Dumka, Kiev (1969)
Bryuno, A.D.: The analytic form of differential equations I, II (Russian). Trudy Moskov. Mat. Obshch. 25, 119–262 (1971); 26, 199–239 (1972). English translation of part II only: Trans. Mosc. Math. Soc. 26 (1972), 199–239 (1974). Zbl 0283.34013
Bryuno, A.D.: Stability in a Hamiltonian system. Math. Notes 40, 726–730 (1986). Translated from Mat. Zametki 40(3), 385–392 (1986)
Bryuno, A.D.: A Local Method of Nonlinear Analysis for Differential Equations, 2nd edn. Springer, Berlin (1989). Publication source: Nauka, Moscow (1979)
Chow, S.-N., Hale, J.K.: Methods of Bifurcation Theory. Springer, New York (1982)
Cushman, R.H.: A survey of normalization techniques applied to perturbed Keplerian systems. Dyn. Rep. Expos. Dyn. Syst. New Ser. 1, 54–112 (1992)
Deprit, A.: Canonical transformations depending on a small parameter. Celest. Mech. 1, 12–30 (1969)
Engel, U.M., Stegemerten, B., Ecklet, P.: Normal forms and quasi-integrals for the Hamiltonians of magnetic bottles. J. Phys. A 28, 1425–1448 (1995)
Furta, S.D.: Asymptotic motions of nonsymmetric solid bodies in circular orbit in the presence of third-order resonance (Russian). Kos. Issled. 26(6), 943–944 (1988)
Furta, S.D.: Asymptotic trajectories of dynamical systems (Russian). In: Dynamics, Stochastics, Bifurcation, pp. 89–101. ITU, Gor’kiy (1990). MR 1156355, Zbl 0900.34054
Furta, S.D.: Asymptotic solutions of differential equation systems in the case of purely imaginary eigenvalues. Sov. Appl. Mech. 27(2), 204–208 (1991). Translated from: Differ. Uravn. 26(8), 1348–1351 (1990)
Hori, G.I.: Theory of general perturbations with unspecified canonical variables. J. Jpn. Astron. Soc. 18(4), 287–296 (1966)
Il’yashenko, Y.C.: Analytic unsolvability of the stability problem and the problem of topological classification of the singular points of analytic systems of differential equations. Math. Sb. USSR 28, 140–152 (1976). Translated from: Mat. Sb. 99(2), 162–175 (1976)
Il’yashenko, Y.C.: Divergence of series reducing an analytic differential equation to linear normal form at a singular point. Funct. Anal. Appl. 13, 227–229 (1980). Translated from Funkts. Anal. Prilozh. 13(3), 87–88 (1979)
Il’yashenko, Y.C., Pyartli, A.S.: Materialization of resonances and divergence of normalizing series for polynomial differential equations. J. Sov. Math. 32, 300–313 (1986). Translated from: Trudy Sem. im. G.I. Petrovskovo (8), 111–127 (1982)
Jahnke, E., Emde, F., Lösch, F.: Tables of Higher Functions. McGraw-Hill, New York/ Toronto/London (1960)
Johnson, R., Sell, G.: Smoothness of spectral subbundles and reducibility of quasiperiodic linear differential systems. J. Differ. Equ. 41, 262–288 (1981)
Jorba, A., Simo, C.: On the reducibility of linear differential equations with quasiperiodic coefficients. J. Differ. Equ. 98, 111–124 (1992)
Kamenkov, G.V.: Selected Works in Two Volumes (Russian). Nauka, Moscow (1971/1972). MR 0469662, MR 0492597
Khazin, L.G., Shnol’, E.E.: Investigation of the asymptotic stability of equilibrium under 1:3 resonance (Russian). Preprint no. 67, Inst. Prikl. Mat., Akad. Nauk. SSSR (1978). MR 514794
Khazin, L.G., Shnol’, E.E.: The simplest cases of algebraic unsolvability in problems of asymptotic stability. Sov. Math. Dokl. 19, 773–776 (1978). Translated from Dokl. Akad. Nauk. SSSR 240(60, 1309–1311 (1978)
Khazin, L.G., Shnol’, E.E.: Equilibrium stability conditions under 1:3 resonance. J. Appl. Math. Mech. 44(2), 229–237 (1980)
Khazin, L.G., Shnol’, E.E.: Stability of Critical Equilibrium States. Manchester University Press, Manchester (1991). Publication source: Nauchn. Tsentr Biol. Issled/Akad. Nauk. SSSR, Pushchino (1985)
Kozlov, V.V.: Symmetries, Topology and Resonances in Hamiltonian Mechanics. Springer, New York (1996)
Kozlov, V.V.: Uniform distribution on a torus. Mosc. Univ. Math. Bull. 59(2), 23–31 (2004). Translated from: Vestn. Mosk. Univ. Ser. I Mat. Mekh. (2), 22–29, 78 (2004)
Krasil’nikov, P.S.: Necessary and sufficient conditions for stability under 1:3 resonance (Russian). In: Research on Stability and Vibration Problems and their Application to the Dynamics of Aircraft, pp. 31–37. MAI, Moscow (1980)
Krasil’nikov, P.S.: On extensions of the solution space of Hamilton-Jacobi equations and their application to stability problems (Russian). Preprint No. 550, Inst. Prob. Mech. Akad. Nauk. (1995)
Markeev, A.P.: Stability of a canonical system with two degrees of freedom in the presence of resonance. J. Appl. Math. Mech. 32(4), 766–772 (1968). Translated from: Prikl. Mat. Mekh. 32(4), 738–744 (1968)
Markeev, A.P.: On motions asymptotic to triangular points of libration of the restricted circular three-body problem. J. Appl. Math. Mech. 51(3), 277–282 (1987). Translated from: Prikl. Mat. Mekh. 51(3), 355–362 (1987)
Markeev, A.P.: Resonances and asymptotic trajectories in Hamiltonian systems. J. Appl. Math. Mech. 54(2), 169–173 (1990). Translated from Prikl. Mat. Mekh. 54(2), 207–212 (1990)
Molchanov, A.M.: Subdivision of motions and asymptotic methods in the theory of nonlinear oscillations (Russian). Dokl. Akad. Nauk. SSSR 2(5), 1030–1033 (1961). MR 0119495
Moser, J.: Lectures on Hamiltonian Systems. American Mathematical Society, Providence (1968)
Narasimkhan, P.: Analysis on Real and Complex Manifolds. North-Holland, Amsterdam (1985). Publication source: Mir, Moscow (1973)
Shnol’, E.E.: Nonexistence of algebraic criteria for asymptotic stability under 1:3 resonance (Russian). Preprint no. 45, Inst. Prikl. Mat. Akad. Nauk. SSSR (1977)
Shterenlikht, L.M.: Lyapunov canonic transformations and normal Hamiltonian forms. J. Appl. Math. Mech. 39(4), 578–587 (1975). Translated from Prikl. Mat. Mekh. 39, 604–613 (1975)
Siegel, C.L.: Über die Existenz einer Normalform analytischer Hamiltonischer Differentialgleichungen in der Nähe einer Gleichgewichtslösung. Math. Ann. 128, 144–170 (1954)
Sokol’skiy, A.G.: On the stability of an autonomous Hamiltonian system with two degrees in the case of equal frequencies. J. Appl. Math. Mech. 38(5), 741–749 (1974). Translated from: Prikl. Mat. Mekh. 38(5), 791–799 (1974)
Sokol’skiy, A.G.: On stability of an autonomous Hamiltonian system with two degrees of freedom under first-order resonance. J. Appl. Math. Mech. 41(1), 20–28 (1977). Translated from Prikl. Mat. Mekh. 41(1), 24–33 (1977)
Sokol’skiy, A.G.: On the stability of Hamiltonian systems in the case of zero frequencies (Russian). Differ. Uravn. 17(8), 1509–1510 (1981). Zbl 0467.34043
Treshchev, D.V.: An estimate of irremovable nonconstant terms in the reducibility problem. In: Kozlov, V.V. (ed.) Dynamical Systems in Classical Mechanics, Transl. Ser. 2, vol. 168, pp. 91–128. American Mathematical Society, Providence (1995)
Williamson, J.: On an algebraic problem concerning the normal forms of linear dynamical systems. Am. J. Math. 58, 141–163 (1936)
Zehnder, E.: Generalized implicit function theorems with application to some small divisor problems. Commun. Pure Appl. Math. 28, 91–140 (1975)
Author information
Authors and Affiliations
Rights and permissions
Copyright information
© 2013 Springer-Verlag Berlin Heidelberg
About this chapter
Cite this chapter
Kozlov, V.V., Furta, S.D. (2013). The Critical Case of Pure Imaginary Roots. In: Asymptotic Solutions of Strongly Nonlinear Systems of Differential Equations. Springer Monographs in Mathematics. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-33817-5_2
Download citation
DOI: https://doi.org/10.1007/978-3-642-33817-5_2
Published:
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-33816-8
Online ISBN: 978-3-642-33817-5
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)