Sci Math | Investigation on stability of motion in a critical case by the asymptotic method of nonlinear mechanics.

Sci Math

Article Contents

1. Titles

2. Authors

Investigation on stability of motion in a critical case by the asymptotic method of nonlinear mechanics.

Authors: Nguyễn Văn Đạo,

https://doi.org/10.1007/BF01085482

Publisher, magazine: ,

Publication year: 1971

Lưu Trích dẫn

Abstract

In this article an asymptotic method of nonlinear mechanics is used for solving the problem of stability of motion in the critical case in which the characteristic equation of a first-approximation system has a pair of purely imaginary roots. This method has been found to be very effective in solving a number of practical problems.

Tags: Asymptotic Method, Critical Case, Nonlinear Mechanic.

Trở lại

Các bài viết liên quan đến tác giả Nguyễn Văn Đạo

A chaotic phenomenon in a Van der Pol oscillator subjected to complicated excitations

Interaction between forced and self-excited oscillations in multidimensional systems

Interaction of subharmonic oscillations

An asymptotic method for the study of multifrequency oscillations in quasilinear systems of second order integrodifferential equations

Some problems on nonlinear oscillations

Applied asymptotic methods in nonlinear oscillations

Multifrequency excitation of parametric oscillations of dynamical systems

Parametric oscillations of dynamical systems with cubic term at the modulation depth under the influence of nonlinear frictions

Eine Theorie mehrwertiger abstrakter Prozesse.

Investigation on stability of motion in a critical case by the asymptotic method of nonlinear mechanics.