Hostname: page-component-cd9895bd7-p9bg8 Total loading time: 0 Render date: 2024-12-27T23:13:21.441Z Has data issue: false hasContentIssue false

Solution of Boundary Value Problems Using Dual Reciprocity Boundary Element Method

Published online by Cambridge University Press:  17 January 2017

Hassan Zakerdoost*
Affiliation:
Department of Maritime Engineering, Amirkabir University of Technology, Tehran, Iran
Hassan Ghassemi*
Affiliation:
Department of Maritime Engineering, Amirkabir University of Technology, Tehran, Iran
Mehdi Iranmanesh
Affiliation:
Department of Maritime Engineering, Amirkabir University of Technology, Tehran, Iran
*
*Corresponding author. Email:h.zakerdoost@aut.ac.ir (H. Zakerdoost), gasemi@aut.ac.ir (H. Ghassemi)
*Corresponding author. Email:h.zakerdoost@aut.ac.ir (H. Zakerdoost), gasemi@aut.ac.ir (H. Ghassemi)
Get access

Abstract

In this work we utilize the boundary integral equation and the Dual Reciprocity Boundary Element Method (DRBEM) for the solution of the steady state convection-diffusion-reaction equations with variable convective coefficients in two-dimension. The DRBEM is a numerical method to transform the domain integrals into the boundary only integrals by using the fundamental solution of Helmholtz equation. Some examples are calculated to confirm the accuracy of the approach. The results obtained by the analytic solutions are in good agreement with ones provided by the DRBEM technique.

MSC classification

Type
Research Article
Copyright
Copyright © Global-Science Press 2017 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

[1] Frolkovic, P. and De Schepper, H., Numerical modelling of convection dominated transport coupled with density driven flow in porous media, Adv. Water Res., 24 (2000), pp. 6372.Google Scholar
[2] Kim, S. and Kim, M. C., Multi-cellular natural convection in the melt during convection dominated melting, KSME Int. J., 16 (2002), pp. 94101.CrossRefGoogle Scholar
[3] Bertolazzi, E. and Manzinim, G., Least square-based finite volumes for solving the advection-diffusion of contaminants in porous media, Appl. Numer. Math., 51 (2004), pp. 451461.Google Scholar
[4] Chen, W., Lin, J. and Chen, C. S., The method of fundamental solutions for solving exterior axisymmetric Helmholtz problems with high wave-number, Adv. Appl. Math. Mech., 5 (2013), pp. 477493.CrossRefGoogle Scholar
[5] Zhang, X., An, X. and Chen, C. S., Local RBFs based collocation methods for unsteady Navier-Stokes equations, Adv. Appl. Math. Mech., 7 (2015), pp. 430440.CrossRefGoogle Scholar
[6] Chen, Y. H. and Sheu, W. H., Two-dimensional scheme for convection-diffusion with linear production, Numer. Heat Transfer B, 37 (2000), pp. 365377.Google Scholar
[7] Sheu, W. H., Wang, S. K. and Lin, R. K., An implicit scheme for solving the convectiondiffusionreaction equation in two dimensions, J. Comput. Phys., 164 (2000), pp. 123142.Google Scholar
[8] Sheu, T. W. H. and Chen, H. Y. H., A multi-dimensional monotonic finite element model for solving the convectiondiffusion-reaction equation, Int. J. Numer. Meth. Fluids, 39 (2002), pp. 639656.Google Scholar
[9] Tezduyar, T. E., Park, Y. J. and Deans, H. A., Finite element procedures for time-dependent convectiondiffusionreaction systems, Int. J. Numer. Meth. Fluids, 7 (2005), pp. 10131033.CrossRefGoogle Scholar
[10] Shipilova, O., Haario, H. and Smolianski, A., Particle transport method for convection problems with reaction and diffusion, Int. J. Numer. Meth. Fluids, 54 (2007), pp. 12151238.Google Scholar
[11] Bonet Chaple, R. P., Numerical Stabilization of Convection-Diffusion-Reaction Problems, Delft Institute of Applied Mathematics, Faculty of Electric Engineering, Mathemathics and Computer Science, Delft, Netherlands, 2006.Google Scholar
[12] Heitmann, N. and Peurifoy, S., Stabilization of the evolutionary convection-diffusion problem: introduction and experiments, Proceedings of the SSHE-MA, Spring, 2007.Google Scholar
[13] John, V. and Schmeyer, E., Finite element methods for time-dependent convectiondiffusionreaction equations with small diffusion, Comput. Meth. Appl. Mech. Eng., 198 (2008), pp. 475494.Google Scholar
[14] Wei, L. N. and Tong, L. W., Entire solutions in reaction-advection-diffusion equations with bistable nonlinearities in heterogeneous media, Sci. China Math., 7 (2010), pp. 17751786.Google Scholar
[15] Barrenechea, G. R., John, V. and Knobloch, P., A nonlinear local projection stabilization for convection-diffusion-reaction equations, Numer. Math. Adv. Appl., (2011), pp. 237245.Google Scholar
[16] Nadukandia, P., O¨natea, E. and Garcíaa, J., A high-resolution PetrovGalerkin method for the convectiondiffusionreaction problem, Part IIA multidimensional extension, Comput. Meth. Appl. Mech. Eng., 213216 (2012), pp. 327352.Google Scholar
[17] Nesliturk, A. and Harari, I., The nearly-optimal Petrov-Galerkin method for convectiondiffusion problems, Comput. Meth. Appl. Mech. Eng., 192 (2003), pp. 25012519.Google Scholar
[18] Smolianski, A., Shipilova, O. and Haario, H., A fast high-resolution algorithm for linear convection problems: Particle transport method, Int. J. Numer. Meth. Eng., 70 (2007), pp. 655684.Google Scholar
[19] Gomez, H., Colominas, I., Navarrina, F. and Casteleiro, M., A discontinuous Galerkin method for a hyperbolic model for convection-diffusion problems in CFD, Int. J. Numer. Meth. Eng., 71 (2007), pp. 13421364.CrossRefGoogle Scholar
[20] Brebbia, C. A., Telles, C. F. and Wrobel, L. C., Boundary Element Techniques, SpringerVerlag, Berlin, 1984.Google Scholar
[21] Paris, F. and Canas, J., Boundary Element Method: Fundamental and Applications, Oxford University Press, Oxford, 1997.Google Scholar
[22] Ang, W. T., A Beginner's Course in Boundary Element Methods, USA, Universal Publishers, 2007.Google Scholar
[23] Ramachandran, P. A., Boundary Element Methods in Transport Phenomena, Computational Mechanics Publication, Southampton, Boston, 1994.Google Scholar
[24] Wrobel, L. C., The Boundary Element Method, Applications in Thermo-Fluids and Acoustics, John Wiley Press, 2001.Google Scholar
[25] Bozkaya, N. and Sezgin, M. T., BEM solution to magneto-hydrodynamic flow in a semiinfinite duct, Int. J. Numer. Meth. Fluids, 70 (2012), pp. 300312.Google Scholar
[26] Hosseinzadeh, H., Dehghan, M. and Mirzaei, D., The boundary elements method for magneto-hydrodynamic (MHD) channel flows at high Hartmann numbers, Appl. Math. Model., 37 (2013), pp. 2337–235.CrossRefGoogle Scholar
[27] Damanpack, A. R., Bodaghi, M., Ghassemi, H. and Sayehbani, M., Boundary element method applied to the bending analysis of thin functionally graded plates, Latin Amer. J. Solids Structure, 12 (2013), pp. 549570.Google Scholar
[28] Pisa, C. D. and Aliabadi, M. H., An efficient BEM formulation for analysis of bond-line cracks in thin walled aircraft structures, Int. J. Fracture, 179 (2013), pp. 129145.CrossRefGoogle Scholar
[29] Skerget, L. and Rek, Z., Boundary-domain integral method using a velocityvorticity formulation, Eng. Anal. Bound. Elem., 15 (1995), pp. 359370.Google Scholar
[30] Nardini, D. and Brebbia, C. A., A new approach to free vibration analysis using boundary elements, Appl. Math. Model., 7 (1983), pp. 157162.Google Scholar
[31] Dehghan, M. and Mirzaei, D., A numerical method based on the boundary integral equation and dual reciprocity methods for one-dimensional Cahn-Hilliard equation, Eng. Anal. Bound. Elem., 33 (2009), pp. 522528.Google Scholar
[32] Dehghan, M. and Mirzaei, D., The dual reciprocity boundary element method (DRBEM) for two-dimensional sine-Gordon equation, Comput. Methods Appl. Mech. Eng., 197 (2008), pp. 476486.Google Scholar
[33] Yun, B. I. and Ang, W. T., A dual-reciprocity boundary element method for axisymmetric thermoelastostatic analysis of non-homogeneous materials, Eng. Anal. Bound. Elem., 36 (2012), pp. 17761786.Google Scholar
[34] Shiva, A. and Adibi, H., A numerical solution for advection-diffusion equation using dual reciprocity method, Numer. Methods Partial Differential Equation, 29 (2013), pp. 843856.Google Scholar
[35] Dehghan, M. and Ghesmati, A., Application of the dual reciprocity boundary integral equation technique to solve the nonlinear KleinGordon equation, Comput. Phys. Commun., 181 (2010), pp. 14101418.Google Scholar
[36] Bozkaya, N. and Sezgin, M. T., The DRBEM solution of incompressible MHD flow equations, Int. J. Numer. Meth. Fluids, 67 (2011), pp. 12641282.CrossRefGoogle Scholar
[37] Purbolaksono, J. and Aliabadi, M. H., Stability of Euler's method for evaluating large deformation of shear deformable plates by dual reciprocity boundary element method, Eng. Anal. Bound. Elem., 34 (2010), pp. 819823.Google Scholar
[38] Xing, W., Wen, C. and Zhuo, J. F., Solving inhomogeneous problems by singular boundary method, J. Marine Sci. Tech., 21 (2013), pp. 814.Google Scholar
[39] Tanaka, M. and Chen, W., Coupling dual reciprocity BEM and differential quadrature method for time-dependent diffusion problems, Appl. Math. Model., 25 (2001), pp. 257268.Google Scholar
[40] Partridge, P. W., Brebbia, C. A. and Wrobel, L. C., The Dual Reciprocity Boundary Element Method, Computational Mechanics Publications, Southampton, 1992.Google Scholar
[41] Partridge, P. W., Dual reciprocity BEM: Local versus global approximation functions for diffusion, convection and other problems, Eng. Anal. Bound. Elem., 14 (1994), pp. 349356.CrossRefGoogle Scholar
[42] Yamada, T., Wrobel, L. C. and Power, H., On the convergence of the dual reciprocity boundary element method, Eng. Anal. Bound. Elem., 13 (1994), pp. 291298.Google Scholar
[43] Golberg, M. A. and Chen, C. S., The theory of radial basis functions applied to the bem for non-homogeneous partial differential equations, Boundary Elements Commun., 5 (1994), pp. 5761.Google Scholar
[44] Golberg, M. A., The numerical evaluation of particular solutions in the BEM-A review, Boundary Elements Commun., 6 (1995), pp. 99106.Google Scholar
[45] Partridge, P. W., Approximation functions in the dual reciprocity method, Boundary Element Methods Commun., 8 (1997), pp. 14.Google Scholar
[46] Partridge, P. W. and Brebbia, C. A., Computer implementation of the BEM dual reciprocity method for the solution of general field equations, Commun. Appl. Numer. Methods, 6 (1990), pp. 8392.Google Scholar
[47] DeFigueiredo, D. B., Boundary Element Analysis of Convection-Diffusion Problems, Ph.D. Thesis, Wessex Institute of Technology, Southampton, UK, 1990.Google Scholar
[48] Kopka, Helmut and Daly, Patrick W., A Guide to LaTeX, Addison-Wesley, 1999.Google Scholar
[49] Knuth, Donald E., The TeXbook, Addison-Wesley, 1992.Google Scholar
[50] Other, A. N., A demonstration of the LaTeX2e class file for the International Journal for Numerical Methods in Engineering, Int. J. Numer. Meth. Eng., 00 (2000), pp. 16.Google Scholar
[51] Yin, Z., Clercx, H. J. H. and Montgomery, D. C., An easily implemented task-based parallel scheme for the Fourier pseudospectral solver applied to 2D Navier-Stokes turbulence, Comput. Fluids, 33 (2004), pp. 509520.Google Scholar