Author, Subjects, Keywords

Cited Author

 
 
   » By Author or Editor
 » Browse Author by Alphabet
 » By Journal
 » By Subjects
 » By Affiliations
 » By Type
 » By Year
 » By Latest Additions
 
 
   » By Author
 » Top 20 Authors
 » Top 20 Article
 » Top 20 Journal Cited
 » Top 20 Cited
 » Top 20 Author Cited
 » Usage Since Sept 2007


 
 
 

Login | Create Account

Penyelesaian Persamaan Resapan-Gompertz menggunakan Kaedah Penguraian Adomian

Norhasimah Mahiddin, and Mohd Salmi Mohd Noorani, (2007) Penyelesaian Persamaan Resapan-Gompertz menggunakan Kaedah Penguraian Adomian. Malaysian Journal of Science, 26 (SKSM14 Special Issue). pp. 35-41. ISSN 13943065

Full text not available from this repository.

Affiliations

Universiti Kebangsaan Malaysia. Centre for Mathematical Studies

Abstract

Dalam kertas ini, kami mempertimbangkan suatu proses fesapan yang dipadankan dengan fungsi Gompertz bagi menghasilkan persamaan-resapan Gompertz yang diselesaikan dengan menggunakan kaedah penguraian Adomian. Kami buktikan bahawa kaedah ini adalah menumpu dan wujud penyelesaian.

Item Type:Journal
Keywords:Persamaan resapan-Gompertz; Kaedah penguraian Adomian
Subjects:Q Science, Computer Science
ID Code:2650

1. Adomian, G. (1988). A review of the decomposition method in applied mathematics. J. Math. Anal. App. 135: 501-544.

2. Abassy, Tamer A., El-Tawil, Magdy A. and Salleh, Hassan K. (2007). The solution of Burger's and good Boussinesq equations using ADM-Pade technique. Chaos, Solitons and Fractals 32 (3): 1008-1026.

3. Yue-yue Wang, Chao-qing Dai, Lei Wu and Jie-fang Zhang. (2007). Exact and numerical solitary wave solutions of generalized Zakharov equation by the Adomian decomposition method. Chaos, Solitons and Fractals 32 (3): 1208-1214.

4. Mehdi Tatani, Mehdi Dehghan and Mohsen Razzaghi (2007). Application of the ADM for the Fokker-Planck equation, Math. Comput. Model 45 (5-6): 639-650.

5. Kamdem, J.S. and Zhijun Qiao (2007). Decomposition method for the Camassa-Holm equation. Chaos, Solitons and Fractals 31 (2): 437-447.

6. Abbasbandy, S. (2007). A numerical solution of Blasius equation by ADM and comparison with homotopy perturbation method. Chaos, Solitons and Fractals 31 (1): 257-260.

7. Maleknejad, K. and Fadaei Yani, M.R. (2006). A computational method for system of Volterra-Fredholm integral equations. Appl. Math. Comput.183 (1): 589-595.

8. Qi Wang (2006). Numerical solution for fractional KdV-Burgers equation by ADM. Appl. Math. Comput. 182 (2): 1048-1055.

9. Momani, S. and Shamagfeh, N. (2006). Decomposition method for solving fractional Riccati differential equations. Appl. Math. Comput. 182 (2): 1083-1092.

10. Attili, B.S. and Lesnic, D. (2006). An efficient method for computing eigen elements of Sturm-Liouville fourth-order boundary value problems. Appl. Math. Comput. 182(2):

1247-1254.

11. Abdul Majid Wazwaz (2006). Pade approximants and ADM for solving the Flierl-Petviashivili equation and its variants. Appl. Math. Comput. 182 (2): 1812-1818.

12. Hashim I., Noorani M.S.M. and Batiha B. (2006). A note on the ADM for the generalized Huxley equation. Appl. Math. Comput. 181 (2): 1439-1445.

13. Necat Polat, Dogan Koya and H. Ilhan Tutalar (2006). An analytic and numerical solution to a modified Kawahara equation and a convergence analysis of the method. Appl. Math. Comput. 181 (1): 193-199.

14. Ngarhasta, N., Some, B., Abbaoui, K. and Cherrualt, Y. (2002). New numerical study of adomian method applied to a diffusion model. Kybernetes 31 (1): 61-75.

15. Cherrualt, Y. (1989). Convergence of Adomian's method. Kyberrietes 18: 31-38.

16. Mavoungou, T. and Cherrualt, Y. (1992). Convergence of Adomian's method and applications to nonlinear partial differential equations. Kybernetes 21 (6): 13-25.

Repository Staff Only: item control page
 
 
 
 
 
   
© Copyright 2007 MyAIS Faculty of Computer Science and Information Technology, University of Malaya – All Rights Reserved. Malaysian Abstracting and Indexing System is powered by EPrints 3 which is developed by the School of Electronics and Computer Science at the University of Southampton. More information and software credits.