Numerical Study of Static and Dynamic Instabilities of Pinned-Pinned Pipe under Different Parameters
- 1 USTO-MB, Algeria
- 2 University of Djilali Bounaama-Khamis Meliana, Algeria
- 3 Mostaganem University-Abdelhamid Ibn Badis, Algeria
Abstract
In this study, the natural frequencies of the pipe transporting an fluid resting on an elastic Winkler-type and the critical velocities of instabilities are obtained by the standard finite element method. A dynamic characteristic of a pipe carrying internal fluid undergoes mechanical load due to inertia effect of fluid, Coriolis force, fluid kinetic force due to fluid flow velocity, dynamic load due to inertia effect on the pipe structure. A numerical modal analysis is realized in the fluid-structure interaction configuration. One dimensional beam finite element is used for investigating the dynamic behavior of the thin pipe. According to the approved method, the different elementary matrices were extracted, which were including to a code called Matlab. We developed a program under Matlab with R2017b version, where computations are in the complex planes. The initial approach is based on some research and analytical models. The numerical results show satisfactory agreement with the analytical results. The increase in flow velocity, mass ratio and length reduced from the rigidity of the system. Regions and range of instabilities are presented by numerical aspects. We determined the influence of the different parameters on the static and dynamic instabilities of the system.
DOI: https://doi.org/10.3844/ajeassp.2020.725.735
Copyright: © 2020 Dahmane Mouloud, Zahaf Samir, Benkhettab Mohamed and Boutchicha Djilali. This is an open access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original author and source are credited.
- 3,046 Views
- 1,244 Downloads
- 1 Citations
Download
Keywords
- Pipe Conveying Fluid
- Natural Frequency
- Critical Velocity
- Instability
- Elastic Foundation
- FEM
- MATLAB