利用微分变换法对粘弹性地基上的流体输送管道进行分析研究

O. Adeleye, A. Yinusa, Ihuoma V. Diwe
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引用次数: 0

摘要

本研究采用微分变换法对粘弹性地基上的流体输送管道的振动进行了分析研究。研究分析了改良温克勒粘弹性地基中新的随时间变化的粘度参数的影响。控制方程是一个四阶偏微分方程,带有针销边界条件,需要一种特殊的分析方法来求解。应用微分变换法求解了粘弹性地基上流体输送管道的支配偏微分方程。在改进的 Winkler 粘弹性模型中实施并模拟了随时间变化的粘度参数,以确定粘弹性地基的行为。所获得的分析解与 Runge-Kutta 四阶数值方法进行了验证。研究了地基刚度、地基阻尼系数和频率质量比对支配模型方程的影响。此外,还比较了粘弹性地基与弹性地基上管道的弯曲和挠度。分析和数值解法非常一致。研究发现,地基刚度的增加会导致管道固有频率的增加。此外,与弹性地基上的管道振动相比,粘弹性地基上的管道振动得到了更好的控制和降低。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Analytical Studies of Fluid Conveying Pipes on Viscoelastic Foundation Using Differential Transforms Method
This study presents an analytical investigation of the vibration of fluid-conveying pipes on viscoelastic foundations using the differential transform method. The effects of a new time dependent viscosity parameter in the modified Winkler viscoelastic foundation is studied and analyzed. The governing equation is a fourth-order partial differential equation with pinned-pinned boundary conditions, which required a special analytical method for solution. The differential transform method was applied to obtain the solution of the governing partial differential equation for the fluid-conveying pipes on viscoelastic foundations. The time-dependent viscosity parameter in the modified Winkler viscoelastic model was implemented and simulated to determine the behavior of the viscoelastic foundation. The obtained analytical solution was validated with Runge-Kutta order four numerical method. The effects of foundation stiffness , coefficient of foundation damping and the frequency mass ratio on the governing model equation were investigated. In addition, the bending and deflection of the pipe on a viscoelastic foundation are compared with those on an elastic foundation. The analytical and the numerical solutions are in good agreement. From the study, it is observed that an increase in the foundation stiffness results in increase in the pipe inherent frequencies. Furthermore, the vibration of the pipe on a viscoelastic foundation shows better control and reduction compared with its vibration on an elastic foundation.
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