1 Department of Applied Mathematics and Computer Science, Technical University of Denmark
In recent years several authors have proposed 'easier numerical methods' to find multiple attractors and the critical speed in railway dynamical problems. Actually, the methods do function in some cases, but they are not safe in the sense that you will calculate the relevant critical parameter values with a reasonable accuracy. In some cases the 'easier numerical methods' are really just a gamble. In this presentation the methods will be discussed. For this purpose linearisations of the nonlinear dynamical problem are made. A linearisation of the nonlinear dynamical problem simplifies the calculations and may give relevant answers to important questions such as the possibility of resonance phenomena in the designs, but a linearisation is not always allowed, and it does not help to find the critical speed of a railway vehicle. We shall also address the curious fact that the hunting motion is more robust than the ideal stationary state motion in the track.
Proceedings of Icrare2013, 2013
Main Research Area:
3rd International Conference on Recent Advances in Railway Engineering (ICRARE 2013)
School of Railway Engineering, Iran University of Science and Technology