Communications - Scientific Letters of the University of Zilina 2015, 17(3):37-46 | DOI: 10.26552/com.C.2015.3.37-46

FEM/BEM Techniques for Modelling of Local Fields in Contact Mechanics

Milan Zmindak1, Leszek Radziszewski2, Zoran Pelagic1, Milos Falat1
1 Department of Applied Mechanics, Faculty of Mechanical Engineering University of Zilina, Slovakia
2 Faculty of Mechatronics and Machine Building, Kielce University of Technology, Poland

This contribution contains description of modelling technique of contact problems of bodies with curved surfaces when assumption of infinitesimal displacements can be considered to give sufficient accuracy for both displacement and stress analysis. This assumption considers that the local configuration of the bodies in contact will not be influenced during the deformation process and only dimensions and shape of the contact surfaces and contact pressures will change by the load conditions. Such assumptions enable to reduce the contact problem considerably, if the local contact displacement and stress fields are modelled as local fields inside large elements (sub-domains) using superposition of a local Hertz type field and a smooth field modelled in a classical way using large FEM or BEM technique.

A technique of obtaining the complex solution of the bodies in contact as a combination of the local contact field defined by the Boussinesq's solution and the smooth field modelled by multi-domain BEM is described and considered to be a basis for the modelling and design of contact problems containing large gradient displacements.

Keywords: point and line Hertzian contact; infinitesimal displacements; large element, sub-domain concept; FEM, BEM technique

Published: August 31, 2015  Show citation

ACS AIP APA ASA Harvard Chicago Chicago Notes IEEE ISO690 MLA NLM Turabian Vancouver
Zmindak, M., Radziszewski, L., Pelagic, Z., & Falat, M. (2015). FEM/BEM Techniques for Modelling of Local Fields in Contact Mechanics. Communications - Scientific Letters of the University of Zilina17(3), 37-46. doi: 10.26552/com.C.2015.3.37-46
Share...
Download citation
  • BibTeX (.bib)
  • Bookends (.ris)
  • EasyBib (.ris)
  • EndNote (.enw)
  • EndNote 8 (.xml)
  • ISI WoS (.isi)
  • Medlars (.medlars)
  • Mendeley (.ris)
  • MODS (.xml)
  • Papers (.ris)
  • RefWorks (.txt)
  • RefManager (.ris)
  • RIS (.ris)
  • MS Word (.xml)
  • Zotero (.ris)
    • Open full article

    References

    1. PASTOREK, P., PELAGIC, Z., ZMINDAK, M.: FEM Analysis of Stresses in Dynamic Contact Problems. Proc. of Dynamics of Rigid and Deformable Bodies 2013, 11th intern. conference, October 9-11 2013, Usti nad Labem, 2013 ISBN 978-80-7414-607-7.
    2. ESCHMANN, P., HASBARGEN, L., WEIGAND, K.: Ball and Roller Bearings, Theory, Design and Applications, John Wiley & Sons Ltd : Chichester, 1985.
    3. CHANGSEN, W., Analysis of Rolling Element Bearings, Mech. Eng. Publications Ltd : London, 1987.
    4. PILKEY, W. D.: Formulas for Stress, Strain, and Structural Matrices, John Wiley : New York, 1990.
    5. HILLS, D. A., NOWELL, D., SACKFIELD, A. Mechanics of Elastic Contacts, Butterworth Heinemann Ltd : Oxford, 1993. Go to original source...
    6. CASTLEBERRY, G. A.: Analyzing Contact Stresses More Accurately, Machine Design, 1984, pp. 92-97.
    7. KALKER, J. J.: An Algorithm for the Computation of the Frictionless Contact Pressure between Two Bodies of Revolution, TH Delft, 1981.
    8. SMITH, J. O., LIU, C. K.: Stresses Due to Tangential and Normal Loads on an Elastic Solid with Application to Some Contact Stress Problems, J. of Appl. Mech., 21, 1953, 157-166. Go to original source...
    9. TIMOSHENKO, S. P., GOODIER, J. N.: Theory of Elasticity, 3rd ed., McGraw-Hill : New York. 1970. Go to original source...
    10. BLOKH, B. I.: Theory of Elasticity (in Russian), Univ. Press : Kharkov, 1964.
    11. KNOTHE, K., LE-THE, H.: A Contribution to the Calculation of the Contact Stress Distribution between Two Elastic Bodies of Revolution with Non-elliptical Contact, Computers & Structures, 18, 1984, pp. 025-1033. Go to original source...
    12. SCHAUDE, B.: Optimal Profiling of Rolling Elements of Cylinder Rollers (in German), Dissertation, University Karlsruhe, 1978.
    13. VIJAYAKAR, S.: A Combined Surface Integral and Finite Element Solution for a Three-dimensional Contact Problems, Int. J. Numer. Meth. in Engng., 31, (1991), 525-545. Go to original source...
    14. MUSKHELISHVILI, N., I.: Some Basic Problems of Mathematical Theory of Elasticity, (in Russian), Nauka : Moscow (1966).
    15. KOMPIS, V.: HANDRIK, M., ELESZTOS, P., KOCH, F.: Analysis and Design of Roller Bearings, EAEC 2001 Congress, Bratislava, June, 2001, CD-ROM 2001.
    16. BALAS, J. SLADEK, J. SLADEK, V.: Stress Analysis by Boundary Element Methods, Elsevier : Amsterdam 1989.
    17. KUPRADZE, V. D.: Potential Methods in Theory of Elasticity (in Russian), Nauka : Moscow, 1963.
    18. KOMPIS, V.: Selected Topics in Boundary Integral Formulations fo Solids and Fluids, CISM Courses and Lectures, No. 433, Springer - Verlag : Wien, 2002.a Go to original source...
    19. KUHN, G.: Boundary Element Technique in Elastostatics and Linear Fracture Mechanics, in E. Stein, W. L. Wendland, eds., Finite Element and Boundary Element Techniques Form Mathematical and Engineering Point of View. CISM Courses and Lectures, No. 301, Springer - Verlag : Wien, 1988, pp. 109-170. Go to original source...
    20. LOVE, A. E. H.: A Treatice on the Mathematical Theory of Elasticity, Cambridge University Press : Cambridge, 1927.

    This is an open access article distributed under the terms of the Creative Commons Attribution 4.0 International License (CC BY 4.0), which permits use, distribution, and reproduction in any medium, provided the original publication is properly cited. No use, distribution or reproduction is permitted which does not comply with these terms.


    Return to the content