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Frictionless Contact Problem for a Functionally Graded Layer Loaded Through Two Rigid Punches Using Finite Element Method

Published online by Cambridge University Press:  19 July 2019

A. Polat*
Affiliation:
Department of Construction Technology Munzur UniversityTunceli, Turkey
Y. Kaya
Affiliation:
Civil Engineering Department, Gümüşhane UniversityGümüşhane, Turkey
K. Bendine
Affiliation:
Department of Mechanics Djillali Liabès University of Sidi Bel-AbbèsAlgeria
T.Ş. Özşahin
Affiliation:
Civil Engineering Department, Karadeniz Technical UniversityTrabzon, Turkey
*
*Corresponding author ([email protected])
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Abstract

In this study, continuous contact problem in the functionally graded (FG) layer loaded with two rigid flat blocks resting on the elastic semi-infinite plane was analyzed by the finite element method. The two-dimensional numerical model of the FG layer was made with the software added to the ANSYS program. This software can be adapted to all contact problem types by making minor changes. The accuracy check of the program was performed by comparing with the analytical solution of the problem by homogeneous layer and its solution by the finite element method. So, fast and practical solutions can be obtained by the developed finite element method on many applications such as; automotive, aviation and space industry applications. The comparisons made showed that the proposed solution gave good results at acceptable levels. In the problem, it was thought that all surfaces were frictionless. The external loads P and Q were transmitted to the FG layer via two flat rigid blocks. Normal stresses between the FG layer and the elastic plane, initial separation loads, initial separation distances and contact stresses under the blocks were investigated for various dimensionless quantities.

Type
Research Article
Copyright
© The Society of Theoretical and Applied Mechanics 2019 

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References

REFERENCES

Miyamoto, Y., Kaysser, W. A., Rabin, B. H., Kawasaki, A., Ford, R. G., Functionally Graded Materials Design, Processing and Applications, Kluwer Academic Publishers, Boston, (1999).Google Scholar
Hertz, H., “On The Contact of Elastic Solids,” Journal für die Reine und Angewandte Mathematik, 92, pp.156-171, (1982).Google Scholar
Dhaliwal, R.S., Rau, I.S., “Axisymmetric Boussinesq Problem for A Thick Elastic Layer Under A Punch of Arbitrary Profile,” International Journal of Engineering Science, 8, pp. 843-856, (1970).CrossRefGoogle Scholar
Uflyand, I. S., Survey of Articles on The Applications of Integral Transforms In The Theory of Elasticity, Raleigh N.C.S.,North Carolina State College Translation Series, (1965).Google Scholar
Adams, G.G., Bogy, D.B., “The Plane Solution for The Elastic Contact Problem of A Semi-Infinite Strip and Half Plane,” Journal of Applied Mechanics, 43, pp. 603-607, (1976).CrossRefGoogle Scholar
Galin, L.A., Contact Problems in The Theory of Elasticity, North Carolina State College Translation Series,Raleigh,North Carolina,(1961).Google Scholar
Özşahin, T. Ş., “Frictionless Contact Problem for A Layer on An Elastic Half Plane Loaded By Means of Two Dissimilar Rigid Punches,” Structural Engineering and Mechanics, 25 (4), pp. 383403, (2007).CrossRefGoogle Scholar
Kahya, V., Birinci, A., Erdöl, R., “Frictionless Contact Problem An Elastic Layer Bonded to Rigid Support and A Rigid Stamp,” Mathematical and Computational Applications, 6, 1, pp.1322, (2001).CrossRefGoogle Scholar
Dolbow, J., Moës, N., Belytschko, T., “An Extended Finite Element Method for Modeling Crack Growth with Frictional Contact,” Computer Methods in Applied Mechanics and Engineering, 190, (51–52),pp. 68256846, (2001).CrossRefGoogle Scholar
Chan, S.K., Tuba, I.S., “A Finite Element Method for Contact Problems of Solid Bodies- Part I. Theory and Validation,” International Journal of Mechanical Sciences, 13,pp.519530, (1971).Google Scholar
Tsuta, T., Yamaji, S., Theory and Practice in Finite Element Structural Analysis, University of Tokyo Press Japan,pp.1050, (1973).Google Scholar
Öner, E., Yaylacı, M., Birinci, A., “Analytical Solution of A Contact Problem and Comparison with The Results from FEM,” Structural Engineering and Mechanics,54 (2),pp. 607622, (2015).CrossRefGoogle Scholar
Yaylacı, M., Öner, E., Birinci, A., “Comparison between Analytical and ANSYS Calculations for A Receding Contact Problem,” Journal of Engineering Mechanics, 140 (9), (2014).CrossRefGoogle Scholar
Güler, M.A., Erdoğan, F., “The Frictional Sliding Contact Problems of Rigid Parabolic and Cylindrical Stamps on Graded Coatings,” International Journal of Mechanical Sciences, 49 (2), pp. 161182, (2007).CrossRefGoogle Scholar
Yang, J., Ke, L. L., “Two-Dimensional Contact Problem for A Coating– Graded Layer– Substrate Structure under A Rigid Cylindrical Punch,” International Journal of Mechanical Sciences, 50, pp. 985994, (2008).CrossRefGoogle Scholar
Liu, T. J., Zhang, C., Swang, Y., Xing, Y. M., “The Axisymmetric Stress Analysis of Double Contact Problem for Functionally Graded Materials Layer with Arbitrary Graded Materials Properties,” International Journal of Solids And Structures, 96, pp. 229239,(2016).CrossRefGoogle Scholar
El-Borgi, S., Abdelmoula, R., Keer, L., “A Receding Contact Plane Problem Between A Functionally Graded Layer and A Homogeneous Substrate”, International Journal of Solids and Structures, 43, pp. 658674, (2006).Google Scholar
Çömez, İ., “Contact Problem of A Functionally Graded Layer Resting on A Winkler Foundation,” Acta Mechanica, 224 (11), pp.28332843, (2013).CrossRefGoogle Scholar
Chidlow, S. J., Chong, W. F., Teodorescu, M., “On The Two-Dimensional Solution of Both Adhesive and Non-Adhesive Contact Problems Involving Functionally Graded Materials,” European Journal of Mechanics, 39, pp.86103, (2013).Google Scholar
Yan, J., Li, X., “Double Receding Contact Plane Problem Between A Functionally Graded Layer and An Elastic Layer,” European Journal of Mechanics A-Solids, 53,pp. 143150, (2015).CrossRefGoogle Scholar
Abhilash, M. N., Murty, H., “Finite Element Analysis of 2-D Elastic Contacts Involving Fgms,” International Journal for Computational Methods in Engineering Science and Mechanics, pp. 253257, (2014).CrossRefGoogle Scholar
Demirhan, N., Kanber, B., “Finite Element Analysis of Frictional Contacts of FGM Coated Elastic Members,” Mechanics Based Design of Structures and Machines, 41, pp. 383398, (2013).CrossRefGoogle Scholar
Güler, M. A., Küçüksucu, A., Yılmaz, K. B., Yıldırım, B., “On The Analytical and Finite Element Solution of Plane Contact Problem of A Rigid Cylindrical Punch Sliding over A Functionally Graded Orthotropic Medium,” International Journal of Mechanical Sciences, 120, pp. 1229, (2016).CrossRefGoogle Scholar
Çömez, İ., Birinci, A., Erdol, R., “Double Receding Contact Problem for A Rigid Stamp and Two Elastic Layers,” European Journal of Mechanics A-Solids, 23(2), pp.301309, (2004).CrossRefGoogle Scholar
ANSYS Software, Houston PA, Swanson Analysis System.Google Scholar
Erdogan, F., Gupta, G., “On the Numerical Solutions of Singular Integral Equations,” The Quarterly Journal of Mechanics and Applied Mathematic, 29, pp.525534, (1972).Google Scholar
Kouider, B., Boukhoulda, B.F., Nouari, M., Satla, Z., “Structural Modeling and Active Vibration Control of Smart FGM Plate through ANSYS,” International Journal of Computational Methods, 14(2), pp. 920, (2016).Google Scholar
Polat, A., Kaya, Y., Özşahin, T.Ş., “Analytical solution to continuous contact problem for a functionally graded layer loaded through two dissimilar rigid punches”, Meccanica, 53(14), pp. 35653577, (2018).CrossRefGoogle Scholar
Kaya, Y., Polat, A., Özşahin, T.Ş., “Comparison of FEM Solution with Analytical Solution of Continuous and Discontinuous Contact Problem”, Sigma Journal of Engineering and Natural Sciences, 36(4), 977992, (2018).Google Scholar
Hu, Z., “Contact around a Sharp Corner with Small Scale Plasticity”, Advances in Materials, 6(1-1), pp. 1017, (2017).Google Scholar
Hu, Z., Lu, W., Thouless, M.D., Barber, J.R., “Effect of plastic deformation on the evolution of wear and local stress fields in fretting”, International Journal of Solids and Structures, 82, pp. 18, (2016).CrossRefGoogle Scholar
Hu, Z., Lu, W., Thouless, M.D., “Slip and wear at a corner with Coulomb friction and an interfacial strength”, Wear, 338-339, pp. 242251, (2015).Google Scholar
Öner, E., Adiyaman, G., Birinci, A., “Continuous contact problem of a functionally graded layer resting on an elastic half-plane”, Archives of Mechanics, 69(1), pp. 5373, (2017).Google Scholar