On the two-step iterative method of solving frictional contact problems in elasticity

Todor Angelov; Asterios Liolios

International Journal of Applied Mathematics and Computer Science (2005)

  • Volume: 15, Issue: 2, page 197-203
  • ISSN: 1641-876X

Abstract

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A class of contact problems with friction in elastostatics is considered. Under a certain restriction on the friction coefficient, the convergence of the two-step iterative method proposed by P.D. Panagiotopoulos is proved. Its applicability is discussed and compared with two other iterative methods, and the computed results are presented.

How to cite

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Angelov, Todor, and Liolios, Asterios. "On the two-step iterative method of solving frictional contact problems in elasticity." International Journal of Applied Mathematics and Computer Science 15.2 (2005): 197-203. <http://eudml.org/doc/207735>.

@article{Angelov2005,
abstract = {A class of contact problems with friction in elastostatics is considered. Under a certain restriction on the friction coefficient, the convergence of the two-step iterative method proposed by P.D. Panagiotopoulos is proved. Its applicability is discussed and compared with two other iterative methods, and the computed results are presented.},
author = {Angelov, Todor, Liolios, Asterios},
journal = {International Journal of Applied Mathematics and Computer Science},
keywords = {contact problems with friction; iterative methods},
language = {eng},
number = {2},
pages = {197-203},
title = {On the two-step iterative method of solving frictional contact problems in elasticity},
url = {http://eudml.org/doc/207735},
volume = {15},
year = {2005},
}

TY - JOUR
AU - Angelov, Todor
AU - Liolios, Asterios
TI - On the two-step iterative method of solving frictional contact problems in elasticity
JO - International Journal of Applied Mathematics and Computer Science
PY - 2005
VL - 15
IS - 2
SP - 197
EP - 203
AB - A class of contact problems with friction in elastostatics is considered. Under a certain restriction on the friction coefficient, the convergence of the two-step iterative method proposed by P.D. Panagiotopoulos is proved. Its applicability is discussed and compared with two other iterative methods, and the computed results are presented.
LA - eng
KW - contact problems with friction; iterative methods
UR - http://eudml.org/doc/207735
ER -

References

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  2. Angelov T.A. and Liolios A.A. (2004): An iterative solution procedure for Winkler-type contact problems with friction. -Z. Angew. Math. Mech., Vol. 84, No. 2, pp. 136-143. Zbl1254.74104
  3. Cvapvatinva A.R. and Cocu M. (1991): Internal approximation of quasi-variational inequalities. - Num. Math., Vol. 59, No. 4, pp. 385-398. Zbl0742.65055
  4. Cocu M. (1984): Existence of solutions of Signorini problems with friction.- Int. J. Eng. Sci., Vol. 22, No. 10, pp. 567-575. Zbl0554.73096
  5. Demkowicz L. and Oden J.T. (1982): On some existence and uniqueness results in contact problems with nonlocal friction. - Nonlin. Anal., Vol. TMA 6,pp. 1075-1093. Zbl0511.73122
  6. Duvaut G. and Lions J.-L. (1976): Inequalities in Mechanics and Physics.- Berlin: Springer. Zbl0331.35002
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  8. Hlavaček I., Haslinger J., Nečas J. and Lovišek J. (1988): Solution of Variational Inequalities in Mechanics. - New York: Springer. Zbl0654.73019
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  10. Klarbring A., Mikelič A. and Shillor M. (1989): On friction problems with normal compliance. - Nonlin. Anal., Vol. TMA 13, No. 8,pp. 935-955. Zbl0707.73068
  11. Lee C.Y. and Oden J.T. (1993a): Theory and approximation of quasistatic frictional contact problems. - Comp. Math. Appl. Mech.Eng., Vol. 106, No. 3, pp. 407-429. Zbl0783.73083
  12. Lee C.Y. and Oden J.T. (1993b): A priori error estimation of hp-finite element approximations of frictional contact problems with normal compliance. - Int. J.Eng. Sci., Vol. 31, No. 6, pp. 927-952. Zbl0772.73078
  13. Nečas J., Jarušek J. and Haslinger J. (1980): On the solutionof the variational inequality to the Signorini problem with small friction.- Bull. Unione Math. Italiana, Vol. 17-B(5), pp. 796-811. Zbl0445.49011
  14. Oden J.T. and Carey G.F. (1984): Finite Elements: Special Problems in Solid Mechanics, Vol. 5, - Englewood Cliffs, N.J.: Prentice-Hall. Zbl0535.73050
  15. Panagiotopoulos P.D. (1975): A Nonlinear Programming Approach to the Unilateral Contact and Friction Boundary Value Problem in the Theory of Elasticity. - Ing. Archiv., Vol. 44, No. 6, pp. 421-432. Zbl0332.73018
  16. Panagiotopoulos P.D. (1985): Inequality Problems in Mechanics and Applications. Convex and Nonconvex Energy Functions. - Boston: Birkhuser. Zbl0579.73014
  17. Rabier P.J. and Oden J.T. (1987): Solution to Signorini-like contact problemsthrough interface models. I. Preliminaries and formulation of a variational equality. - Nonlin. Anal., Vol. TMA 11, No. 12, pp. 1325-1350. 
  18. Rabier P.J. and Oden J.T. (1988): Solution to Signorini-like contact problemsthrough interface models. II. Existence and uniqueness theorems. -Nonlin. Anal., Vol. TMA 12, No. 1, pp. 1-17. 

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