Araştırma Makalesi
Yıl 2019,
, 39 - 50, 20.04.2019
Öz
This study discusses a numerical methods for hybrid fuzzy differential equations by fifth order RK Nystrom Method for fuzzy differential equations. We prove the convergence result and give numerical examples to illustrate the theory.
Anahtar Kelimeler
Fuzzy differential equations Hybrid systems Runge-Kutta Nystrom method of order five
Kaynakça
- [1] S. L. Chang and A. Zadeh, On Fuzzy Mapping and Control, IEEEE Trans. Systems Man Cybernet 2 (1972), 30–34.
- [2] D. Dubois and H.Prade, Towards Fuzzy Differential Calculus: Part 3, Differentiation, Fuzzy Sets and System, 8 (1982,) 225–233.
- [3] M. L. Puri, D.A. Ralescu, Differentials of fuzzy functions, J. Math. Anal. Appl., 91 (1983), 321–325.
- [4] R. Goetschel, W.Voxman, Elementary fuzzy calculus, Fuzzy Sets and Systems, 18 (1986), 31–43.
- [5] A. Kandel, W.J. Byatt, Fuzzy Differential Equations, in Proceedings of the International Conference on Cybernetics and Society, Tokyo, (1978) 1213–1216.
- [6] O. Kaleva, Fuzzy Differential Equations, Fuzzy Sets and Systems, 24 (1987), 301–317.
- [7] O. Kaleva, The Cauchy problem for Fuzzy Differential Equations, Fuzzy Sets and Systems, 35 (1990), 389–396.
- [8] S. Seikkala, On the fuzzy initial value problem, Fuzzy Sets and Systems, 24 (1987), 319–330.
- [9] O. He, W. Yi, On fuzzy differential Equations, Fuzzy Sets Systems, 24 (1989), 321–325.
- [10] P. Kloedan, Remarks on Piano-like theorems for fuzzy differential Equations,Fuzzy Sets and Systems, 44 (1991), 161–164.
- [11] S. Pederson, M. Sambandham, Numerical solution to Hybrid fuzzy systems, Mathematical and Computer Modelling, 45 (2007), 1133–1144.
- [12] L. J. Jowers, J. J. Buckley K. D. Reilly, Simulating continuous fuzzy systems, Inform. Sci., 177 (2007), 436–448.
- [13] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Improved Euler Method, International Journal of Applied Mathematical Science, 38 (2012), 1847–1862.
- [14] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Runge Kutta Verner Method, Far East Journal of Applied Mathematics, 86 (2014), 93–115.
- [15] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Runge Kutta Method of order five, Applied Mathematical Science, 6 (2012), 69–72.
- [16] K. Kanakarajan, M.Sambath, Numerical Solution for hybrid fuzzy differential equations by improved predictor-corrector method, Nonlinear Studies, 19 (2012), 171–185.
- [17] M. Sambandham, Perturbed Lyapunov-like functions and Hybrid Fuzzy Differential Equations, Int. J. Hybrid Syst., 2 (2002) 23-34.
- [18] C. X. Wu, M. Ma, Embedding problem of fuzzy number space Part I, Fuzzy Sets Syst.,44 (1991) 33-38.
- [19] J. J.Bukley, T. Feuring, Fuzzy Differential Equations, Fuzzy Sets Syst., 110 (200) 43-54.
Yıl 2019,
, 39 - 50, 20.04.2019
Öz
Kaynakça
- [1] S. L. Chang and A. Zadeh, On Fuzzy Mapping and Control, IEEEE Trans. Systems Man Cybernet 2 (1972), 30–34.
- [2] D. Dubois and H.Prade, Towards Fuzzy Differential Calculus: Part 3, Differentiation, Fuzzy Sets and System, 8 (1982,) 225–233.
- [3] M. L. Puri, D.A. Ralescu, Differentials of fuzzy functions, J. Math. Anal. Appl., 91 (1983), 321–325.
- [4] R. Goetschel, W.Voxman, Elementary fuzzy calculus, Fuzzy Sets and Systems, 18 (1986), 31–43.
- [5] A. Kandel, W.J. Byatt, Fuzzy Differential Equations, in Proceedings of the International Conference on Cybernetics and Society, Tokyo, (1978) 1213–1216.
- [6] O. Kaleva, Fuzzy Differential Equations, Fuzzy Sets and Systems, 24 (1987), 301–317.
- [7] O. Kaleva, The Cauchy problem for Fuzzy Differential Equations, Fuzzy Sets and Systems, 35 (1990), 389–396.
- [8] S. Seikkala, On the fuzzy initial value problem, Fuzzy Sets and Systems, 24 (1987), 319–330.
- [9] O. He, W. Yi, On fuzzy differential Equations, Fuzzy Sets Systems, 24 (1989), 321–325.
- [10] P. Kloedan, Remarks on Piano-like theorems for fuzzy differential Equations,Fuzzy Sets and Systems, 44 (1991), 161–164.
- [11] S. Pederson, M. Sambandham, Numerical solution to Hybrid fuzzy systems, Mathematical and Computer Modelling, 45 (2007), 1133–1144.
- [12] L. J. Jowers, J. J. Buckley K. D. Reilly, Simulating continuous fuzzy systems, Inform. Sci., 177 (2007), 436–448.
- [13] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Improved Euler Method, International Journal of Applied Mathematical Science, 38 (2012), 1847–1862.
- [14] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Runge Kutta Verner Method, Far East Journal of Applied Mathematics, 86 (2014), 93–115.
- [15] T. Jayakumar, K. Kanakarajan, Numerical Solution for Hybrid Fuzzy System by Runge Kutta Method of order five, Applied Mathematical Science, 6 (2012), 69–72.
- [16] K. Kanakarajan, M.Sambath, Numerical Solution for hybrid fuzzy differential equations by improved predictor-corrector method, Nonlinear Studies, 19 (2012), 171–185.
- [17] M. Sambandham, Perturbed Lyapunov-like functions and Hybrid Fuzzy Differential Equations, Int. J. Hybrid Syst., 2 (2002) 23-34.
- [18] C. X. Wu, M. Ma, Embedding problem of fuzzy number space Part I, Fuzzy Sets Syst.,44 (1991) 33-38.
- [19] J. J.Bukley, T. Feuring, Fuzzy Differential Equations, Fuzzy Sets Syst., 110 (200) 43-54.
Toplam 19 adet kaynakça vardır.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Matematik |
| Bölüm | Makaleler |
| Yazarlar | |
| Yayımlanma Tarihi | 20 Nisan 2019 |
| Gönderilme Tarihi | 13 Haziran 2018 |
| Kabul Tarihi | 22 Ocak 2019 |
| Yayımlandığı Sayı | Yıl 2019 |
Kaynak Göster
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Journal of Mathematical Sciences and Modelling
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