论文信息 - Calculation of Normal Forms of the Euler-Poisson Equations

Calculation of Normal Forms of the Euler-Poisson Equations

In the paper [1], the special case of the Euler---Poisson equations describing movements of a heavy rigid body with a fixed point is considered. Among stationary points of the system, two of one-parameter families were chosen. These families correspond to the resonance of eigenvalues (0, 0, λ,−λ, 2λ,−2λ) of the matrix of the linear part of the system, also in [1] it was conjectured the absence of the additional first integral (with respect to well-known 3 integrals (2)) near these families, except of classical cases of global integrability. In this paper, the supposition is proved by calculations of coefficients of the normal form.

Alexander D. Bruno | Victor F. Edneral | A. Bruno | V. Edneral

[1] Victor F. Edneral,et al. Application of the resonant normal form to high-order nonlinear ODEs using Mathematica , 2003 .

[2] V. Golubev. Lectures on integration of the equations of motion of a rigid body about a fixed point , 1960 .

[3] Aleksandr Dmitrievich Bri︠u︡no. Power Geometry in Algebraic and Differential Equations , 2013 .

[4] Alexander D. Bruno,et al. Normal forms and integrability of ODE systems , 2005, Programming and Computer Software.

[5] Victor F. Edneral. An Algorithm for Construction of Normal Forms , 2007, CASC.