RUS  ENG
Full version
JOURNALS // Regular and Chaotic Dynamics
Regul. Chaotic Dyn., 2020, Volume 25, Issue 6, Pages 553–580 (Mi rcd1084)
The Tippedisk: a Tippetop Without Rotational Symmetry
Simon Sailer, Simon R. Eugster, Remco I. Leine

References
1. Acary, V. and Brogliato, B., Numerical Methods for Nonsmooth Dynamical Systems: Applications in Mechanics and Electronics, Lect. Notes Appl. Comput. Mech., 35, Springer, Berlin, 2008, XXI, 525 pp.  crossref  mathscinet  zmath  elib
2. Ashbaugh, M. S., Chicone, C. C., and Cushman, R. H., “The Twisting Tennis Racket”, J. Dynam. Differential Equations, 3:1 (1991), 67–85  crossref  mathscinet  zmath  adsnasa
3. Uspekhi Fiz. Nauk, 187:9 (2017), 1003–1006 (Russian)  mathnet  crossref  crossref  adsnasa
4. Uspekhi Fiz. Nauk, 173:4 (2003), 407–418 (Russian)  mathnet  crossref  crossref
5. Borisov, A. V., Mamaev, I. S., and Kilin, A. A., “Dynamics of Rolling Disk”, Regul. Chaotic Dyn., 8:2 (2003), 201–212  mathnet  crossref  mathscinet  zmath  adsnasa
6. Bou-Rabee, N. M., Marsden, J. E., and Romero, L. A., “Tippe Top Inversion As a Dissipation-Induced Instability”, SIAM J. Appl. Dyn. Syst., 3:3 (2004), 352–377  crossref  mathscinet  zmath
7. Cohen, C. M., “The Tippe Top Revisited”, Am. J. Phys., 45:1 (1977), 12–17  crossref  mathscinet  adsnasa
8. Garcia, A. and Hubbard, M., “Spin Reversal of the Rattleback: Theory and Experiment”, Proc. Roy. Soc. London Ser. A, 418:1854 (1988), 165–197  mathscinet  adsnasa
9. Glocker, Ch., Set-Valued Force Laws: Dynamics of Non-smooth Systems, Lect. Notes Appl. Comput. Mech., 1, Springer, Berlin, 2013, IX, 222 pp.  mathscinet
10. Glocker, Ch., “Simulation of Hard Contacts with Friction: An Iterative Projection Method”, Recent Trends in Dynamical Systems, Springer Proc. Math. Stat., 35, eds. A. Johann, H.-P. Kruse, F. Rupp, S. Schmitz, Springer, Basel, 2013, 493–515  mathscinet  zmath
11. Hemingway, E. G. and O'Reilly, O. M., “Perspectives on Euler Angle Singularities, Gimbal Lock, and the Orthogonality of Applied Forces and Applied Moments”, Multibody Syst. Dyn., 44:1 (2018), 31–56  crossref  mathscinet  zmath
12. Jachnik, J., Spinning and Rolling of an Unbalanced Disk, Master's Thesis, Imperial College London, London, 2011, 46 pp.
13. Karapetyan, A. V. and Zobova, A. A., “Tippe-Top on Visco-Elastic Plane: Steady-State Motions, Generalized Smale Diagrams and Overturns”, Lobachevskii J. Math., 38:6 (2017), 1007–1013  crossref  mathscinet  zmath
14. Kessler, P. and O'Reilly, O. M., “The Ringing of Euler's Disk”, Regul. Chaotic Dyn., 7:1 (2002), 49–60  mathnet  crossref  mathscinet  zmath
15. Le Saux, C., Leine, R. I., and Glocker, Ch., “Dynamics of a Rolling Disk in the Presence of Dry Friction”, J. Nonlinear Sci., 15:1 (2005), 27–61  crossref  mathscinet  zmath  adsnasa
16. Leine, R. I., “Experimental and Theoretical Investigation of the Energy Dissipation of a Rolling Disk during Its Final Stage of Motion”, Arch. Appl. Mech., 79:11 (2009), 1063–1082  crossref  zmath  elib
17. Leine, R. I. and Glocker, Ch., “A Set-Valued Force Law for Spatial Coulomb – Contensou Friction”, Eur. J. Mech. A Solids, 22:2 (2003), 193–216  crossref  mathscinet  zmath  adsnasa
18. Leine, R. I. and Nijmeijer, H., Dynamics and Bifurcations of Non-Smooth Mechanical Systems, Lect. Notes Appl. Comput. Mech., 18, Springer, Berlin, 2004, xii+236 pp.  crossref  mathscinet  zmath
19. Magnus, K., Kreisel: Theorie und Anwendungen, Springer, Berlin, 1971, xii+493 pp.  mathscinet  zmath
20. Moffatt, H., “Euler's Disk and Its Finite-Time Singularity”, Nature, 404:6780 (2000), 833–834  crossref  adsnasa
21. Moffatt, K. and Shimomura, Y., “Classical Dynamics: Spinning Eggs — A Paradox Resolved”, Nature, 416:6879 (2002), 385–386  crossref  adsnasa
22. Moffatt, K., Shimomura, Y., and Branicki, M., “Dynamics of an Axisymmetric Body Spinning on a Horizontal Surface: 1. Stability and the Gyroscopic Approximation”, Proc. Roy. Soc. London Ser. A, 460:2052 (2004), 3643–3672  crossref  mathscinet  zmath  adsnasa
23. Moreau, J. J., “Unilateral Contact and Dry Friction in Finite Freedom Dynamics”, Non-Smooth Mechanics and Applications, CISM Courses and Lectures, 302, eds. J. J. Moreau, P. D. Panagiotopoulos, Springer, Wien, 1988, 1–82  mathscinet
24. Nützi, G. E., Non-Smooth Granular Rigid Body Dynamics with Applications to Chute Flows, PhD Thesis, ETH Zürich, Zürich, 2016, x, 224 pp.
25. O'Reilly, O. M., “The Dynamics of Rolling Disks and Sliding Disks”, Nonlinear Dyn., 10:3 (1996), 287–305  crossref
26. Poinsot, L., Théorie nouvelle de la rotation des corps, Bachelier, Paris, 1834, 56 pp.
27. Przybylska, M. and Rauch-Wojciechowski, S., “Dynamics of a Rolling and Sliding Disk in a Plane: Asymptotic Solutions, Stability and Numerical Simulations”, Regul. Chaotic Dyn., 21:2 (2016), 204–231  mathnet  crossref  mathscinet  zmath  adsnasa  elib
28. Rauch-Wojciechowski, S., “What Does It Mean to Explain the Rising of the Tippe Top?”, Regul. Chaotic Dyn., 13:4 (2008), 316–331  mathnet  crossref  mathscinet  zmath  adsnasa
29. Rockafellar, R. T., Convex Analysis, Princeton Univ. Press, Princeton, N.J., 1970, 472 pp.  mathscinet  zmath
30. Tiaki, M. M., Hosseini, S. A. A., and Zamanian, M., “Nonlinear Forced Vibrations Analysis of Overhung Rotors with Unbalanced Disk”, Arch. Appl. Mech., 86:5 (2016), 797–817  crossref

© Steklov Math. Inst. of RAS, 2026