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arXiv:2311.06252v2 Announce Type: replace
Abstract: For the first time, the development of the nonlinear geometrically exact governing equations and corresponding boundary conditions of hanging cantilevered flexible pipes conveying fluid in the framework of the quaternion system is undertaken. Additionally, the linear model is derived from the nonlinear one for the stability analysis. The linear and nonlinear mathematical formulations based on the geometrically exact rotation-based model are also extracted from the current model. The obtained integro-partial differential-algebraic equations are converted to a set of ordinary differential algebraic equations via the Galerkin discretization technique, and the resulting equations are numerically solved to determine the self-excited oscillation behavior of the system in the post-flutter region. The critical flow velocities, time traces, bifurcation diagrams, phase planes, and deformed configurations are compared with those reported based on the geometrically exact rotation-based model. The comparative studies divulge that the present model can successfully capture the stability and dynamic characteristics of the system. An interesting feature of the current ordinary differential-algebraic equations is that their coefficients are time-independent, unlike those of geometrically exact rotation-based equations in the Galerkin form. The results show this feature leads to a remarkable decrease in the computational cost, although the number of equations increases and the nonlinearity becomes stronger. The challenging issues with the numerical solution utilized in this study are also discussed.