Nonlinear Wave Equations for Buckle Propagation in an Elastic Pipeline
スポンサーリンク
概要
- 論文の詳細を見る
This paper demonstrates the derivation of the equations previously proposed for an 'elastic' buckle propagation in a pipeline subjected to bending under axial tension and hydrostatic side pressure. Formulation is given for a thin cylindrical shell of infinite length in such a way that bending gives rise to a geometrically large but elastic deflection so that a significant cross-sectional deformation takes place. For simplicity, a material behavior of the pipe is assumed by Hooke's law. On the basis of the three-dimensional theory of nonlinear elasticity, the derivation utilizes the asymptotic-expansion method in terms of the thickness-coordinate of the pipe, combined with a Fourier expansion in the circumferential direction and a 'long-wave approximation' in the axial direction. Derived are the nonlinear wave equations which couple the beam-flexural mode with the ring-flexural mode. A further simplification and a physical significance of the equations thus derived are discussed.
- 一般社団法人日本機械学会の論文
- 1989-10-15
著者
関連論文
- Edge-Layer Theory for Shallow-Water Waves over a Step-Reflection and Transmission of a Soliton
- Nonlinear Modulation of Torsional Waves in Elastic Rod
- Nonlinear Interaction between Short and Long Capillary-Gravity Waves
- Nonlinear Wave Equations for Buckle Propagation in an Elastic Pipeline
- Nonlinear Wave Interactions on a Discrete Transmission Line
- Reflection and Transmission of a Shallow-Water Soliton over a Barrier
- Integral-Equation Method for Burgers Equation with Geometrical-Spreading Effects
- Note on Higher Order Terms in Reductive Perturbation Theory
- Mobile Intrinsic Localized Modes of a Spatially Periodic and Articulated Structure
- Physical Mechanisms of Thermoacoustic Taconis Oscillations