论文信息 - SIMPLEST NORMAL FORMS OF HOPF AND GENERALIZED HOPF BIFURCATIONS

SIMPLEST NORMAL FORMS OF HOPF AND GENERALIZED HOPF BIFURCATIONS

The normal forms of Hopf and generalized Hopf bifurcations have been extensively studied, and obtained using the method of normal form theory and many other different approaches. It is well known that if the normal forms of Hopf and generalized Hopf bifurcations are expressed in polar coordinates, then all odd order terms must, in general, remain in the normal form. In this paper, three theorems are presented to show that the conventional normal forms of Hopf and generalized Hopf bifurcations can be further simplified. The forms obtained in this paper for Hopf and generalized Hopf bifurcations are shown indeed to be the "simplest", and at most only two terms remain in the amplitude equation of the "simplest normal form" up to any order. An example is given to illustrate the applicability of the theory. A computer algebra system using Maple is used to derive all the formulas and verify the results presented in this paper.

Pei Yu | P. Yu

[1] R. I. Bogdanov. Versal deformations of a singular point of a vector field on the plane in the case of zero eigenvalues , 1975 .

[2] G. Sell,et al. The Hopf Bifurcation and Its Applications , 1976 .

[3] P. Holmes,et al. Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.

[4] P. J. Holmes,et al. Bifurcations to divergence and flutter in flow-induced oscillations: A finite dimensional analysis , 1977 .

[5] P. Coullet,et al. A simple global characterization for normal forms of singular vector fields , 1987 .

[6] V. Arnold. LECTURES ON BIFURCATIONS IN VERSAL FAMILIES , 1972 .

[7] F. Takens,et al. On the nature of turbulence , 1971 .

[8] Pei Yu,et al. COMPUTATION OF NORMAL FORMS VIA A PERTURBATION TECHNIQUE , 1998 .

[9] B. Drachman,et al. Computation of normal forms , 1990 .

[10] J. Morrison,et al. Comparison of the Modified Method of Averaging and the Two Variable Expansion Procedure , 1966 .

[11] William F. Langford,et al. Degenerate Hopf bifurcation formulas and Hilbert's 16th problem , 1989 .

[12] S. A. Robertson,et al. NONLINEAR OSCILLATIONS, DYNAMICAL SYSTEMS, AND BIFURCATIONS OF VECTOR FIELDS (Applied Mathematical Sciences, 42) , 1984 .

[13] Floris Takens,et al. Unfoldings of certain singularities of vectorfields: Generalized Hopf bifurcations , 1973 .

[14] Jan A. Sanders,et al. Unique normal forms: The nilpotent Hamiltonian case , 1991 .