The study of track gauge influence on lateral stability of 4-axle rail vehicle model

Authors

  • Mirosław Dusza Warsaw University of Technology, Warsaw, Poland Author

DOI:

https://doi.org/10.5604/08669546.1146973

Keywords:

numerical simulation, critical velocity, track gauge, rail vehicle non-linear stability

Abstract

Analysis of lateral stability of rail vehicle model is the subject of present paper. The method used by the author is based on bifurcation diagrams creation and analysis. The continued study of stability of vehicle model in straight track and curved track and form of the results presentation are original features of the method. Results for the straight track and wide range of radii of the curved track are presented jointly on the combined bifurcation diagrams in this paper. Multibody dynamics software VI-Rail was used for numerical analysis. Passenger vehicle model and track models were created. Analysis of track gauge influence on vehicle model stability is main aim of this paper. But analysis of possibility to adopt the method worked out earlier to the newly used numerical code and model of 4-axle vehicle is the aim either.

References

Alfi S., Mazzola L., Bruni S.: Effect of motor connection on the critical speed of high-speed railway vehicles. Vehicle System Dynamics, Berkeley 2007, Vol. 46, Supplement, pp. 201-214. Taylor & Francis, UK, 2008.

Arias-Cuevas O., Li Z., Popovici R.I., Schipper D. J.: Simulation of curving behaviour under high traction in lubricated wheel-rail contacts. Vehicle System Dynamics, Vol. 48. Supplement, 2010, pp. 299-316.

Arnold M., Burgermeister B., Führer C., Hippmann G., Rill G.: Numerical methods in vehicle system dynamics: state of the art and current developments. Vehicle System Dynamics, Vol. 49. No. 7, July 2011. pp. 1159-1207.

Bezin Y., Iwnicki S.D., Cavalletti M.: The effect of dynamic rail roll on the wheel-rail contact conditions. Vehicle System Dynamics, Berkeley 2007, Vol. 46, Supplement, pp. 107-117, Taylor & Francis, UK. 2008.

Bezin Y., Farrington D., Penny C., Temple B., Iwnicki S.: The dynamic response of slab track constructions and their benefit with respect to conventional ballasted track. Vehicle System Dynamics, Vol. 48, Supplement 2010, pp. 175-193.

Braghin F.. Bruni S., Alfi S.: Critical velocity of railway vehicles, 10th Mini Conference on Vehicle System Dynamics, Identification and Anomalies, Budapest, November 6-8. 2006. Proceedings of the 10lh VSD1A 2006 Mini Conference, Edited by Prof. I. Zobory, pp. 143-152.

Choromański W., Zboiński K.: The software package ULYSSES for automatic generation of equation and simulation of railway vehicle motion. Proc. of Scientific Conf. on Transport Systems Engineering, sec. 4, pp. 47-52, PW i KT PAN, Warszawa 1995.

Dusza M., Zboiński K.: Bifurcation approach to the stability analysis of rail vehicle models in a curved track. The Archives of Transport, volume XXI, issue 1-2, pp. 147-160, Warsaw 2009.

ERRI: B176/3 Benchmark Problem - Results and Assessment. B176/DT290, Utrecht, 1993.

Gasch R., Moelle D., Knothe K.: The effect of non-linearities on the limit-cycles of railway vehicles. Proceedings of the 8th lAVSD-Symposium, Massachusetts Institute of Technology, Cambridge, USA, Swets & Zeitlinger, pp. 207-224, Lisse, 1984.

Hoffmann M., True H.: The dynamics of European two-axle railway freight wagons with UIC standard suspension. Vehicle System Dynamics, Berkeley 2007, Vol. 46, Supplement, pp. 225-236, Taylor & Francis, UK. 2008.

Iwnicki S.D., ed.: The Manchester Benchmarks for Rail Vehicle Simulation, Computer Simulation of Rail Vehicle Dynamics, Vehicle System Dynamics, 31 (supl.), 1999.

Iwnicki S. ed.: Handbook of Railway Vehicle Dynamics. Taylor & Francis Group, LLC, London. New York, 2006.

Kalker J.J.: A fast algorithm for the simplified theory of rolling contact. Vehicle System Dynamics 11, 1982, pp. 1-13.

Karnopp Dean: Vehicle Stability, University of California, USA, 2004.

Kik W. et al.: 1AVSD - Benchmarks for Multibody Simulation Software. Dr Kik's Railway Benchmark Problem Solutions - Results of INRETS-LTN Voco Code. INRETS-LTN, Arcueil, France 1991.

Kisilowski J., Knothe K. (editors): Advanced railway vehicle system dynamics, Wydawnictwa Naukowo-Techniczne, Warsaw 1991.

Knothe K., Bohm F.: History of stability of railway and road vehicles. Vehicle System Dynamics, Vol. 31 (1999), pp. 283-323.

Krupowicz A.: Metody numeryczne zagadnień początkowych równań różniczkowych zwyczajnych, Państwowe Wydawnictwo Naukowe, Warszawa 1986.

Kurzeck B., Hecht M.: Dynamic simulation of friction-induced vibrations in a light railway bogie while curving compared with measurement results, 21st International Symposium IAVSD 2009 Stockholm, Sweden, Vehicle System Dynamics, Vol. 48, Supplement, 2010, pp. 121-138.

Moelle D., Gasch R.: Nonlinear bogie hunting. Proceedings of the 7th IAVSD Symposium, Cambridge University, UK, Swets & Zeitlinger, pp. 455-467, Lisse, 1982.

Piotrowski J.: Kalker’s algorithm Fastsim solves tangential contact problems with slip- dependent friction and friction anisotropy. Vehicle System Dynamics, vol. 48, No 7, July 2010, pp. 869-889.

Piotrowski J., Kik W.: A simplified model of wheel/rail contact mechanics for non-Hertzian problems and its applications in rail vehicle dynamic simulations, Vehicle System Dynamics, Vol. 46, 2008, pp. 27-48.

Piotrowski J., Chollet H.: Wheel-rail contact models for vehicle system dynamics including multi-point contact. Vehicle System Dynamics, Vol. 43 (6-7), pp. 455- 483, June-July 2005.

Polach O.: Characteristic parameters of nonlinear wheel/rail contact geometry. Vehicle System Dynamics, Vol. 48, Supplement, 2010, pp. 19-36.

Polach O.: On non-linear methods of bogie stability assessment using computer simulations, Proc. Inst. Mech. Eng. F.J. Rail Rapid Transit 220(1), 2006, pp. 13-27.

Popp K., Knothe K., Popper C. W.: System dynamics and long-term behaviour of railway vehicles, track and subgrade: report on the DFG priority programme in Germany and subsequent research, Vehicle System Dynamics, Vol. 43, No. 6-7, June-July 2005, pp. 485-538.

Schupp G.: Computational Bifurcation Analysis of Mechanical Systems with Applications to Rail Vehicles, Vehicle System Dynamics, Vol. 41, Supplement, 2004, pp. 458-467.

Shabana A. A., Zaazaa K. E., Sugiyama H.: Railroad Vehicle Dynamics a Computational Approach, Taylor & Francis Group, LLC, London, New York, 2008.

Sitarz M., Sładkowski A., Bizon K., Chruzik K.: Design and investigation of railway weheelsets. Railway wheelsets, monograph, Silesian University of Technology, editor Marek Sitarz, Gliwice 2003.

Standards: PN-EN 13715+ Al, PN-92/K91020, PN-K-91045.

Wilson N., Wu H., Tournay H., Urban C.: Effects of wheel/rail contact patterns and vehicle parameters on lateral stability, 21s1 International Symposium IAVSD 2009 Stockholm, Sweden, Vehicle System Dynamics, Vol. 48, Supplement, 2010, pp. 487-503.

Zboiński K.: Dynamical investigation of railway vehicles on a curved track, European Journal of Mechanics, A Solids 17(6), 1998, pp. 1001-1020.

Zboiński K., Dusza M.: Development of the method and analysis for non-linear lateral stability of railway vehicles in a curved track. Proceedings of 19th IAVSD Symposium, Milan 2005, supplement to Vehicle System Dynamics Vol. 44, 2006. pp. 147-157.

Zboiński K., Dusza M.: Analysis of lateral stability of a railway vehicle model in the context of different values of rail inclination. Proceedings of 10th VSDIA Conference, pp. 153-160, Budapest 2006.

Zboiński K., Dusza M.: Bifurcation approach to the influence of rolling radius modelling and rail inclination on the stability of railway vehicle in a curved track. Proceedings of 20ltl IAVSD Symposium, Berkeley 2007, supplement do Vehicle System Dynamics, Vol. 46, 2008, pp. 1023-1037.

Zboiński K., Dusza M.: Self-exciting vibrations and Hopf's bifurcation in non-linear stability analysis of rail vehicles in curved track, European Journal of Mechanics, Part A/Solids, vol. 29, no. 2, pp. 190-203, 2010.

Zboiński K., Dusza M.: Extended study of rail vehicle lateral stability in a curved track, Vehicle System Dynamics, Vol. 49, No. 5, May 2011, pp. 789-810.

Zboiński K.: Nieliniowa dynamika pojazdów szynowych w łuku, Wydawnictwo Naukowe Instytutu Technologii Państwowego Instytutu Warszawa - Radom 2012.

Downloads

Published

2014-06-30

Issue

Section

Original articles

How to Cite

Dusza, M. (2014). The study of track gauge influence on lateral stability of 4-axle rail vehicle model. Archives of Transport, 30(2), 7-20. https://doi.org/10.5604/08669546.1146973

Share

Most read articles by the same author(s)

1 2 3 4 5 6 7 8 9 10 > >> 

Similar Articles

131-140 of 307

You may also start an advanced similarity search for this article.