EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD

Applied Mathematics and Mechanics (English Edition) ›› 1987, Vol. 8 ›› Issue (1): 1-10.

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EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD

霍麟春, 李骊

Tianjin University, Tianjin

收稿日期:1985-10-02 出版日期:1987-01-18 发布日期:1987-01-18
基金资助:
Projects Supported by the Science Fund of the Chinese Academy of Sciences.

EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD

Huo Lin-chun, Li Li

Tianjin University, Tianjin

Received:1985-10-02 Online:1987-01-18 Published:1987-01-18
Supported by:
Projects Supported by the Science Fund of the Chinese Academy of Sciences.

摘要/Abstract

摘要： In this paper we extend Poincare’s nonlinear oscillation theory of discrete system to continuum mechanics. First we investigate the existence conditions of periodic solution for linear continuum system in the states of resonance and non-resonance. By applying the results of linear theory, we prove that the main conclusion of Poincare’s nonlinear oscillation theory can be extended to continuum mechanics. Besides, in this paper a new method is suggested to calculate the periodic solution in the states of both resonance and nonresonance by means of the direct perturbation of partial differential equation and weighted integration.

关键词: Reissner plate, Hamiltonian system, symplectic geometry, separation of variable

Abstract: In this paper we extend Poincare’s nonlinear oscillation theory of discrete system to continuum mechanics. First we investigate the existence conditions of periodic solution for linear continuum system in the states of resonance and non-resonance. By applying the results of linear theory, we prove that the main conclusion of Poincare’s nonlinear oscillation theory can be extended to continuum mechanics. Besides, in this paper a new method is suggested to calculate the periodic solution in the states of both resonance and nonresonance by means of the direct perturbation of partial differential equation and weighted integration.

Key words: Reissner plate, Hamiltonian system, symplectic geometry, separation of variable

霍麟春;李骊. EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD[J]. Applied Mathematics and Mechanics (English Edition), 1987, 8(1): 1-10.

Huo Lin-chun;Li Li. EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD[J]. Applied Mathematics and Mechanics (English Edition), 1987, 8(1): 1-10.

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EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD

EXTENSION OF POINCARE’S NONLINEAR OSCILLATION THEORY TO CONTINUUM MECHANICS (I)-BASIC THEORY AND METHOD

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