Abstract
Central collisions and energy jumps between two rolling bodies as singular nonlinear phenomena are investigated in vibro-impact system dynamics. For that purpose, an extension of theory of collision of two rigid bodies, in rolling dynamics, is presented. Under the authors’ use of the Petroviċ’s elements of mathematical phenomenology, especially mathematical analogy between kinetic parameters of central collision of two bodies in translator motions and central collision of two rolling different axial symmetrically bodies, new original expressions of two post-collision outgoing angular velocities for each of rolling bodies after collision are defined. Presented results are the generalization of author’s previous published results. Using this new and original result for collisions, the vibro-impact dynamics of two rolling heavy thin disks with different radiuses on the rotating circle trace in vertical plane in the period of series of collisions is investigated. Using the series of the elliptic integrals, new nonlinear equations for obtaining the angles, which defined the disks positions of successive collisions, are defined. Phase trajectories of the disks in vibro-impact dynamics are analytically and graphically presented. Two cases of vibro-impact dynamics when phase portraits contain trigger of coupled singularities and homoclinic phase trajectory in the form of number “eight,” as well as in the case without that trigger of coupled singularities, are discussed. Phase trajectory branches of dynamics of both of the rolling disks in the period from initial positions to first collision between them are presented. By using the pre-collisions impact (arrival) angular velocities and post-collision (outgoing) angular velocities of the rolling bodies, the rates of the total mechanical energy change for each disk in comparison under kinetic state that corresponds to pre- and post-collision are expressed, and also of both of the rolling bodies as system pre-collision and post-collision kinetic states. From the energy analysis, some conclusions are formulated. Full theory and new methodology for the investigation of the vibro-impact system dynamics with rolling bodies is found.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Explore related subjects
Discover the latest articles, news and stories from top researchers in related subjects.References
Andronov, A.A., Vitt, A.A., Haykin, S.: Teoriya Kolebaniy. Nauka, Moskva, pp. 568 (1981)
Guckenheimer, J., Holmes, Ph.: Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Fields. Springer, New York, pp. 461 (1983)
Gerard, J., Daniel, J.: Elementary Stability and Bifurcation Theory. Springer, New York (1980)
Hedrih (Stevanović), R.K.: Nonlinear dynamics of a heavy material particle along circle which rotates and optimal control, chaotic dynamics and control of systems and processes in mechanics. In: Rega, G., Vestroni, F. (eds.) pp. 37–45. IUTAM Book, in Series Solid Mechanics and Its Applications, Editerd by G.M.L. Gladwell, Springer. 2005, XXVI, p. 504, Hardcover ISBN: 1-4020-3267-6 (2005)
Hedrih (Stevanović), R.K.: Rolling heavy disk along rotating circle with constant angular velocity, Computer Algebra Systems, in Teaching and Research, Chapter 2. Problems of Classical Mechanics. In: Alexander, N., Prokopenya, Mirosław Jakubiak (eds.) Volume V, pp. 293–304. Siedlce University of Natural Sciences and Humanities, Siedlce 2015, Copyright Uniwersytet Przyrodniczo-Humanistyczny w Siedlcach, Siedlce (2015), ISSN 2300-7397; ISBN 978-83-7051-779-3
Hedrih (Stevanović), R.K.: Trigger of Coupled Singularities (invited plenary lecture), Dynamical Systems-Theory and Applications, Edited By J. Awrejcewicz and all, Lodz 2001, pp. 51–78 (2001)
Hedrih (Stevanović), R.K.: A trigger of coupled singularities. MECCANICA, 39(3), 295–314 (2004). https://doi.org/10.1023/B:MECC.0000022994.81090.5f,
Hedrih (Stevanović), R.K.: Nonlinear dynamics of a gyro-rotor, and sensitive dependence on initial conditions of a Heav Gyro-rotor forced vibration/rotation motion, semi-plenary invited lecture. In: Chernousko, F.L., Fradkov, A.I. (eds.) Proceedings: COC 2000 IEEE, CSS, IUTAM, SPICS, St. Petersburg, Inst. for Problems of Mech. Eng. of RAS, Vol. 2 of 3, pp. 259–266 (2000)
Hedrih (Stevanović), R.K.: The optimal control in nonlinear mechanical systems with trigger of the coupled singularities, in the book: advances in mechanics: dynamics and control. In: Chernousko, F.L., Kostin, G.V., Saurin, V.V., Yu, A. (eds.) Proceedings of the 14th International Workshop on Dynamics and Control. Ishlinsky Institute for Problems in Mechanics RAS. Nauka, Moscow, pp. 174–182 (2008). ISBN 978-5-02-036667-1
Hedrih (Stevanović), R.K.: Dynamics of coupled systems, Nonlinear Anal Hybrid Syst 2(2): 310–334 (2008)
Hedrih (Stevanović), R.K.: Vibro-impact dynamics of the rollingdisks along rotate circle in vertical plane, dynamical systems, control and stability, thematical. In: Proceedings Awrejcewicz, J., Kaźmierczak, M., Mrozowski, J., Olejnik P. (eds.) 2015, Vol. 13/3, pp. 251–262. Department of Automation, Biomechanics and Mechatronics. ISBN 978-83-7283-708-0 (2015)
Hedrih (Stevanović), R.K.: Dynamics of impacts and collisions of the rolling balls, dynamical systems: theoretical and experimental analysis. In: Proceedings in Mathematics & Statistics, Vol 182, Chapter 13, pp. 157–168. Springer, Part of Springer Science+Business, ISBN 978-3-319-42407-1; ISSN 2194-1009 ISSN2194-1017 (electronic). https://doi.org/10.1007/978-3-319-42408-8
Ismail, A., Stronge, W.J.: Viscoplastic analysis for direct impact of sports balls. Int. J. Non-Linear Mech. 47(4), 16–21 (2012)
Klarbring, A.: Mathematical programming and augmented Lagrangian methods for frictional contact problems. In:Curnier, A. (ed.) Contact Mechanics International Symposium, PPUR (1992)
В.В. Коsлов и Д. В. Треçев, Билиардì-\({\Gamma }\)енетиче ское введение в динамику систем с ударами (Billiards - Genetic introduction in the dynamical systems with impacts) Издателство Московского университета 1991. Москва, стр. 192
Leine, R.I., Brogliato, B., Nijmeijer, H.: Periodic motion induced by the Painlevé Paradox. Adv. Dyn. Control Struct. Mach. Int. Centre for Mech. Sci. 444, 169–194 (2004)
Mitrinović, D.S., Djoković, D.Ž.: Special functions (Specijalne funkcije). Gradjevinska knjiga, Beograd, pp. 267 (1964)
Coaplen, J., Stronge, W.J., Ravani, B.: Work equivalent composite coefficient of restitution. Int. J. Impact Eng. 30, 581–591 (2004)
Coriolis, G.: Théorie mathématique des effets du jeu de billard; suivi des deux celebres memoires publiés en 1832 et 1835 dans le Journal de l’École Polytechnique: Sur le principe des forces vives dans les mouvements relatifs des machines & Sur les équations du mouvement relatif des systèmes de corps (Originally published by Carilian-Goeury, 1835 ed.). Éditions Jacques Gabay. ISBN 2-87647-081-0 (1990)
Coriolis, G.: Sur le principe des forces vives dans les mouvements relatifs des machines. J. De l’Ecole royale polytechnique 13, 268–302 (1832)
Coriolis, G.G.: Sur les équations du mouvement relatif des systèmes de corps. J. De l’Ecole royale polytechnique 15, 144–154 (1835)
Olejnik, P., Awrejcewicz, J., Feckan, M.: Modeling, Analysis and Control of Dynamical Systems with Friction and Impacts, Series A: Vol. 92. World Scientific Series on Nonlinear Science, Singapore, 276 p. (2018) ISBN 978-981-3225-28-2
Payr, M., Glocker, C.: Oblique frictional impact of a bar: analysis and comparison of different impact laws. Nonlinear Dyn. 41, 361–383 (2005)
Pfeiffer, F., Glocker, C.: Multibody Dynamics with Unilateral Contacts. Wiley, Chichester (1996)
Petrović, M.: Elementi matematičke fenomenologije (Elements of mathematical phenomenology), Srpska kraljevska akademija, Beograd, (1911). str. 89
Petrović, M.: Fenomenološko preslikavanje (Phenomenological mapp), Srpska kraljevska akademija, Beograd, (1933). str. 33. http://elibrary.matf.bg.ac.rs/handle/123456789/475
Rašković, D.: Mehanika III–Dinamika ( Mechanics III–Dynamics)), Naučna knjiga, pp. 424. (1972)
Rosenberg, R.M.: Analytical Dynamics of Discrete Systems. Plenum Press, New York (1977)
Stewart, D.E.: Rigid body dynamics with friction and impact. SIAM -180mmRev. 42(1), 3–39 (2000). https://doi.org/10.1137/S0036144599360110
Stronge, W.J.: Impact Mechanics. Cambridge University Press, Cambridge (2000)
Stronge, W.J., James, R., Ravani, B.: Oblique impact with friction and tangential compliance. Philos. Trans. R. Soc. A Math. Phys. Eng. Sci. 359, 2447–2465 (2001)
Veljović, Lj.: Nelinearne oscilacije giro-rotora (Non-linear oscillations of Gyro-rotors), [in Serbian], Doctor’s Degree Thesis, Faculty of Mechanical Engineering in Niš, (2011). Supervisor Katica R. (Stevanović) Hedrih
Acknowledgements
Parts of this research were supported by the Ministry of Sciences and Technology of Republic of Serbia through Mathematical Institute SANU Belgrade Grant ON174001 Project “Dynamics of hybrid systems with complex structures,” Mechanics of materials and Faculty of Mechanical Engineering University of Niš. I would like to express my thanks to Reviewers and Editors for valuable suggestion, who are helpful for the paper to be in correct form with necessary explanations, acceptable for publishing and more understandable for readers.
Author information
Authors and Affiliations
Corresponding author
Additional information
Dedicated to memory of Professor and important scientist Ali Nayfeh (December 21, 1933-March 27, 2017).
Rights and permissions
About this article
Cite this article
Hedrih, K.R.(. Nonlinear phenomena in vibro-impact dynamics: central collisions and energy jumps between two rolling bodies. Nonlinear Dyn 91, 1885–1907 (2018). https://doi.org/10.1007/s11071-017-3988-x
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11071-017-3988-x