Different Implementation Approaches of the Strong Form Meshless Implementation of Taylor Series Method
Abstract
Based on the Taylor series expansion (TSE) and employing the technique of differential transform method (DTM), three new meshless approaches which are called Meshless Implementation of Taylor Series Methods (MITSM) are presented. In particular, Strong Form Meshless Implementation of Taylor Series Methods (SMITSM) are studied in this paper. Then, the basis functions are used to solve a 1D second-order ordinary differential equation and 2D Laplace equation by using the SMITSM. Comparisons are made with the analytical solutions and results of Symmetric Smoothed Particle Hydrodynamics (SSPH) method. We also compared the effectiveness of the SMITSM and SSPH method by considering various particle distributions, nonhomogeneous terms and number of terms in the basis functions. It is observed that the MITSM has the conventional convergence properties and, at the expense of CPU time, yields smaller L2 error norms than the SSPH method, especially in the existence of nonsmooth nonhomogeneous problems.
Keywords
Meshless methods Taylor series element free method strong form heat transfer differential transform method
References
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- Chen JS, Pan C,Wu CT, Liu WK, Reproducing kernel particlemethods for large deformation analysis of non-linear structures, Comput Method Appl Mech Eng, 139, 195–227, 1996.
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- Batra RC, Zhang GM, Search algorithm, and simulation of elastodynamic crack propagation by modified smoothed particle hydrodynamics (MSPH) method, Comput Mech, 40, 531–546, 2007.
- Zhang GM, Batra RC, Symmetric smoothed particle hydrodynamics (SSPH) method and its application to elastic problems, Comput Mech, 43, 321-340, 2009.
- Batra RC, Zhang GM, SSPH basis functions for meshless methods, and comparison of solutions with strong and weak formulations, Comput Mech, 41, 527-545, 2008.
- Karamanli A, Mugan A, Solutions of two–dimensional heat transfer problems by using symmetric smoothed particle hydrodynamics method, Journal of Applied and Computational Mathematics, 1, 1-6, 2012.
- Karamanli A, Mugan A, Strong from meshless implementation of Taylor series method, Appl. Math. Comput, 219, 9069-9080, 2013.
- Bervillier C, Status of the differential transformation method, Appl. Math. Comput, 218, ,10158-10170, 2012.
- Liu H, Song Y, Differential transform method applied to high index differential–algebraic equations, App Math Comput, 184, 748-753, 2007.
- Ayaz F, Solutions of the system of differential equations by differential transform method, App Math Comput, 147, 547-567, 2004.
- Yalcin HS, Arikoglu A, Ozkol I, Free vibration analysis of circular plates by differential transform method, App Math Comput, 212, 377-386, 2009.
- Arikoglu A, Ozkol I, Solution of differential-difference equations by using differential transform method, App Math Comput, 181, 153-162, 2006.
- Arikoglu A, Ozkol I, Solution of difference equations by using differential transform method, App Math Comput, 174, 1216-1228, 2006.
- Arikoglu A, Ozkol I, Solution of boundary value problems for integro differential equations by using differential transform method, App Math Comput, 168, 1145-1158, 2005.
Abstract
References
- Lucy LB, A numerical approach to the testing of the fission hypothesis, Astron J, 82, 1013–1024, 1987.
- Chen JK, Beraun JE, Jin CJ, An improvement for tensile instability in smoothed particle hydrodynamics, Comput Mech, 23, 279–287, 1999.
- Chen JK, Beraun JE, Jin CJ, Completeness of corrective smoothed particlemethod for linear elastodynamics, Comput Mech, 24, 273–285, 1999.
- Liu WK, Jun S, Zhang YF, Reproducing kernel particle methods, Int J Num Meth Fluids, 20, 1081–1106, 1995.
- Liu WK, Jun S, Li S, Adee J, Belytschko T, Reproducing kernel particle methods for structural dynamics, Int J Num Meth Eng, 38, 1655–1679, 1995.
- Chen JS, Pan C,Wu CT, Liu WK, Reproducing kernel particlemethods for large deformation analysis of non-linear structures, Comput Method Appl Mech Eng, 139, 195–227, 1996.
- Zhang GM, Batra RC, Modified smoothed particle hydrodynamics method and its application to transient problems, Comput Mech, 34, 137–146, 2004.
- Batra RC, Zhang GM, Analysis of adiabatic shear bands in elasto-thermo- viscoplastic materials by modified smoothedparticle hydrodynamics (MSPH) method, J Comput Phys, 201, 172–190, 2004.
- Zhang GM, Batra RC, Wave propagation in functionally graded materials by modified smoothed particle hydrodynamics (MSPH) method, J Comput Phys, 222, 374–390, 2007.
- Batra RC, Zhang GM, Search algorithm, and simulation of elastodynamic crack propagation by modified smoothed particle hydrodynamics (MSPH) method, Comput Mech, 40, 531–546, 2007.
- Zhang GM, Batra RC, Symmetric smoothed particle hydrodynamics (SSPH) method and its application to elastic problems, Comput Mech, 43, 321-340, 2009.
- Batra RC, Zhang GM, SSPH basis functions for meshless methods, and comparison of solutions with strong and weak formulations, Comput Mech, 41, 527-545, 2008.
- Karamanli A, Mugan A, Solutions of two–dimensional heat transfer problems by using symmetric smoothed particle hydrodynamics method, Journal of Applied and Computational Mathematics, 1, 1-6, 2012.
- Karamanli A, Mugan A, Strong from meshless implementation of Taylor series method, Appl. Math. Comput, 219, 9069-9080, 2013.
- Bervillier C, Status of the differential transformation method, Appl. Math. Comput, 218, ,10158-10170, 2012.
- Liu H, Song Y, Differential transform method applied to high index differential–algebraic equations, App Math Comput, 184, 748-753, 2007.
- Ayaz F, Solutions of the system of differential equations by differential transform method, App Math Comput, 147, 547-567, 2004.
- Yalcin HS, Arikoglu A, Ozkol I, Free vibration analysis of circular plates by differential transform method, App Math Comput, 212, 377-386, 2009.
- Arikoglu A, Ozkol I, Solution of differential-difference equations by using differential transform method, App Math Comput, 181, 153-162, 2006.
- Arikoglu A, Ozkol I, Solution of difference equations by using differential transform method, App Math Comput, 174, 1216-1228, 2006.
- Arikoglu A, Ozkol I, Solution of boundary value problems for integro differential equations by using differential transform method, App Math Comput, 168, 1145-1158, 2005.
Details
| Primary Language | English |
|---|---|
| Journal Section | Makaleler |
| Authors | |
| Publication Date | June 22, 2015 |
| Published in Issue | Year 2015 |
