Abstract
In several previous studies, it was reported that a supported pipe with small geometric imperfections would lose stability when the internal flow velocity became sufficiently high. Recently, however, it has become clear that this conclusion may be at best incomplete. A reevaluation of the problem is undertaken here by essentially considering the flow-induced static deformation of a pipe. With the aid of the absolute nodal coordinate formulation (ANCF) and the extended Lagrange equations for dynamical systems containing non-material volumes, the nonlinear governing equations of a pipe with three different geometric imperfections are introduced and formulated. Based on extensive numerical calculations, the static equilibrium configuration, the stability, and the nonlinear dynamics of the considered pipe system are determined and analyzed. The results show that for a supported pipe with the geometric imperfection of a half sinusoidal wave, the dynamical system could not lose stability even if the flow velocity reaches an extremely high value of 40. However, for a supported pipe with the geometric imperfection of one or one and a half sinusoidal waves, the first-mode buckling instability would take place at high flow velocity. Moreover, based on a further parametric analysis, the effects of the amplitude of the geometric imperfection and the aspect ratio of the pipe on the static deformation, the critical flow velocity for buckling instability, and the nonlinear responses of the supported pipes with geometric imperfections are analyzed.
Highlights
In the past for a long time, the system of pipes conveying fluid has been a hot topic because of its applications in many engineering industries, e.g., nuclear industry, marine engineering, and aviation industry
The geometric imperfection is in the form of a half sinusoidal wave
To investigate the nonlinear static equilibrium configurations, the linear stability around the static deformations, and the nonlinear dynamics of the fluid-conveying supported pipes with three different geometric imperfections, the absolute nodal coordinate formulation (ANCF) and the extended Lagrange equations written for systems containing non-material volumes are adopted to introduce the nonlinear governing equations
Summary
In the past for a long time, the system of pipes conveying fluid has been a hot topic because of its applications in many engineering industries, e.g., nuclear industry, marine engineering, and aviation industry. Wang et al.[29] performed linear and nonlinear analyses to determine the critical flow velocities and post-buckling responses of the supported pipes conveying fluid with four different types of initial geometric imperfections. Oyelade and Oyediran[32] investigated the linear and nonlinear dynamics of slightly curved pipes under thermal loading with different boundary conditions, including pinned-pinned, clamped-clamped, and clamped-pinned ones, considering both longitudinal and transverse vibrations. They showed that the critical flow velocity for buckling instability would decrease by increasing the thermal loading and increase by increasing the amplitude of the initial curved configuration.
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