METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS

Tuba Gülşen; Mehmet Acar

doi:10.55930/jonas.1321901

Araştırma Makalesi

METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS

Yıl 2023, Cilt: 6 Sayı: 2, 135 - 144, 31.12.2023

Tuba Gülşen Mehmet Acar

https://doi.org/10.55930/jonas.1321901

Öz

The differentiation and integration of an integer order are known as fractional calculus. It is possible to think of the proportional derivative as a generalization of a congruent fractional derivative, which is one of the types of fractional calculus. In this article, utilizing the proportional derivative and its characteristics on the time scale, the method of variation of parameters for the third-order linear nonhomogeneous differential equations is given. Then, an example is provided to illustrate how to apply the provided approach.

Anahtar Kelimeler

Time scales, variation of parameters, proportional derivative

Teşekkür

This research is part of the second author’s master’s thesis, which is carried out at Firat University, Türkiye.

Kaynakça

1. Abdeljewad, T. (2015). On conformable fractional calculus. Journal of Computational and Applied Mathematics, 279, 57–66.
2. Agarwal, R., Bohner, M., O'Regan, D. & Peterson, A. (2002). Dynamic equations on time scales: a survey. Journal of Computational and Applied Mathematics, 141(1-2), 1-26.
3. Anderson, D.R. & Georgiev, S.G. (2020). Conformable Dynamic Equations on Time Scales. Chapman and Hall/CRC.
4. Anderson, D.R. & Ulness, D.J. (2015). Newly defined conformable derivatives. Advances in Dynamical Systems and Applications, 10(2), 109-137.
5. Aulbach, B. & Hilger. S. (1990). A unified approach to continuous and discrete Dynamics. in: Qualitative Theory of Differential Equations (Szeged, 1988), 37–56, Colloq. Math. Soc. János Bolyai, 53 North-Holland, Amsterdam.
6. Benkhettou, N., Brito da Cruz, A. M. C. & Torres, D. F. M. (2015). A fractional calculus on arbitrary time scales: Fractional differentiation and fractional integration. Signal Processing, 107, 230– 237.
7. Benkhettou, N., Hassani, S. & Torres, D. F. M. (2016). A conformable fractional calculus on arbitrary time scales. Journal of King Saud University (Science), 28(1), 93-98.
8. Bohner, M. & Peterson, A. (2001). Dynamic equations on time scales, An introduction with applications. Boston, MA: Birkhauser.
9. Bohner, M. & Peterson, A. (2004). Advances in Dynamic Equations on Time Scales. Boston: Birkhauser.
10. Bohner, M. & Svetlin, G. (2016). Multivariable dynamic calculus on time scales. Cham: Springer.
11. Gulsen, T., Yilmaz, E. & Goktas, S. (2017). Conformable fractional Dirac system on time scales. Journal of Inequalities and Applications, 2017(1), 161.
12. Gülşen, T., Yilmaz, E. & Kemaloğlu, H. (2018). Conformable fractional Sturm-Liouville equation and some existence results on time scales. Turkish Journal of Mathematics, 42(3), 1348-1360.
13. Hilger, S. (1990). Analysis on measure chains a unified approach to continuous and discrete calculus. Results in Mathematics, 18(1).
14. Katugampola, U. (2014). A new fractional derivative with classical properties, arXiv:1410.6535v2.
15. Khalil, R., Horani, M. Al., Yousef, A. & Sababheh, M. (2014). A new definition of fractional derivative. Journal of Computational and Applied Mathematics, 264, 57–66.
16. Li, Y., Ang, K. H. & Chong, G. C. (2006). PID control system analysis and design. IEEE Control Systems Magazine, 26(1), 32-41.
17. Ortigueira, M. D. & Machado, J. T. (2015). What is a fractional derivative?. Journal of Computational Physics, 293, 4-13.
18. Segi Rahmat, M. R. (2019). A new definition of conformable fractional derivative on arbitrary time scales. Advances in Difference Equations, 2019 (1), 1-16.
19. Yilmaz, E., Gulsen, T. & Panakhov, E. S. (2022). Existence Results for a Conformable Type Dirac System on Time Scales in Quantum Physics, Applied and Computational Mathematics an International Journal, 21(3), 279-291.

Yıl 2023, Cilt: 6 Sayı: 2, 135 - 144, 31.12.2023

Tuba Gülşen Mehmet Acar

https://doi.org/10.55930/jonas.1321901

Öz

Kaynakça

1. Abdeljewad, T. (2015). On conformable fractional calculus. Journal of Computational and Applied Mathematics, 279, 57–66.
2. Agarwal, R., Bohner, M., O'Regan, D. & Peterson, A. (2002). Dynamic equations on time scales: a survey. Journal of Computational and Applied Mathematics, 141(1-2), 1-26.
3. Anderson, D.R. & Georgiev, S.G. (2020). Conformable Dynamic Equations on Time Scales. Chapman and Hall/CRC.
4. Anderson, D.R. & Ulness, D.J. (2015). Newly defined conformable derivatives. Advances in Dynamical Systems and Applications, 10(2), 109-137.
5. Aulbach, B. & Hilger. S. (1990). A unified approach to continuous and discrete Dynamics. in: Qualitative Theory of Differential Equations (Szeged, 1988), 37–56, Colloq. Math. Soc. János Bolyai, 53 North-Holland, Amsterdam.
6. Benkhettou, N., Brito da Cruz, A. M. C. & Torres, D. F. M. (2015). A fractional calculus on arbitrary time scales: Fractional differentiation and fractional integration. Signal Processing, 107, 230– 237.
7. Benkhettou, N., Hassani, S. & Torres, D. F. M. (2016). A conformable fractional calculus on arbitrary time scales. Journal of King Saud University (Science), 28(1), 93-98.
8. Bohner, M. & Peterson, A. (2001). Dynamic equations on time scales, An introduction with applications. Boston, MA: Birkhauser.
9. Bohner, M. & Peterson, A. (2004). Advances in Dynamic Equations on Time Scales. Boston: Birkhauser.
10. Bohner, M. & Svetlin, G. (2016). Multivariable dynamic calculus on time scales. Cham: Springer.
11. Gulsen, T., Yilmaz, E. & Goktas, S. (2017). Conformable fractional Dirac system on time scales. Journal of Inequalities and Applications, 2017(1), 161.
12. Gülşen, T., Yilmaz, E. & Kemaloğlu, H. (2018). Conformable fractional Sturm-Liouville equation and some existence results on time scales. Turkish Journal of Mathematics, 42(3), 1348-1360.
13. Hilger, S. (1990). Analysis on measure chains a unified approach to continuous and discrete calculus. Results in Mathematics, 18(1).
14. Katugampola, U. (2014). A new fractional derivative with classical properties, arXiv:1410.6535v2.
15. Khalil, R., Horani, M. Al., Yousef, A. & Sababheh, M. (2014). A new definition of fractional derivative. Journal of Computational and Applied Mathematics, 264, 57–66.
16. Li, Y., Ang, K. H. & Chong, G. C. (2006). PID control system analysis and design. IEEE Control Systems Magazine, 26(1), 32-41.
17. Ortigueira, M. D. & Machado, J. T. (2015). What is a fractional derivative?. Journal of Computational Physics, 293, 4-13.
18. Segi Rahmat, M. R. (2019). A new definition of conformable fractional derivative on arbitrary time scales. Advances in Difference Equations, 2019 (1), 1-16.
19. Yilmaz, E., Gulsen, T. & Panakhov, E. S. (2022). Existence Results for a Conformable Type Dirac System on Time Scales in Quantum Physics, Applied and Computational Mathematics an International Journal, 21(3), 279-291.

Toplam 19 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Yazılım Mühendisliği (Diğer)
Bölüm	Makaleler
Yazarlar	Tuba Gülşen 0000-0002-2288-8050 Mehmet Acar 0000-0003-1280-8034
Yayımlanma Tarihi	31 Aralık 2023
Yayımlandığı Sayı	Yıl 2023 Cilt: 6 Sayı: 2

Kaynak Göster

APA	Gülşen, T., & Acar, M. (2023). METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS. Bartın University International Journal of Natural and Applied Sciences, 6(2), 135-144. https://doi.org/10.55930/jonas.1321901
AMA	Gülşen T, Acar M. METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS. JONAS. Aralık 2023;6(2):135-144. doi:10.55930/jonas.1321901
Chicago	Gülşen, Tuba, ve Mehmet Acar. “METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS”. Bartın University International Journal of Natural and Applied Sciences 6, sy. 2 (Aralık 2023): 135-44. https://doi.org/10.55930/jonas.1321901.
EndNote	Gülşen T, Acar M (01 Aralık 2023) METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS. Bartın University International Journal of Natural and Applied Sciences 6 2 135–144.
IEEE	T. Gülşen ve M. Acar, “METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS”, JONAS, c. 6, sy. 2, ss. 135–144, 2023, doi: 10.55930/jonas.1321901.
ISNAD	Gülşen, Tuba - Acar, Mehmet. “METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS”. Bartın University International Journal of Natural and Applied Sciences 6/2 (Aralık 2023), 135-144. https://doi.org/10.55930/jonas.1321901.
JAMA	Gülşen T, Acar M. METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS. JONAS. 2023;6:135–144.
MLA	Gülşen, Tuba ve Mehmet Acar. “METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS”. Bartın University International Journal of Natural and Applied Sciences, c. 6, sy. 2, 2023, ss. 135-44, doi:10.55930/jonas.1321901.
Vancouver	Gülşen T, Acar M. METHOD OF VARIATION OF PARAMETERS FOR THE THIRD-ORDER LINEAR PROPORTIONAL DYNAMIC EQUATIONS. JONAS. 2023;6(2):135-44.

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