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SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS

Yıl 2024, Cilt: 12 Sayı: 1, 62 - 74, 27.02.2024
https://doi.org/10.20290/estubtdb.1403701

Öz

In this study, we investigate the following four-dimensional difference equations system
{█(u_n=(αu_(n-3) t_(n-2)+β)/(γv_(n-1) t_(n-2) u_(n-3) ), @v_n=(αv_(n-3) u_(n-2)+β)/(γw_(n-1) u_(n-2) v_(n-3) ),n∈N_0,@w_n=(αw_(n-3) v_(n-2)+β)/(γt_(n-1) v_(n-2) w_(n-3) ), @t_n=(αt_(n-3) w_(n-2)+β)/(γu_(n-1) w_(n-2) t_(n-3) ), )┤
where the initial values u_(-d),v_(-d),w_(-d),t_(-d), d∈{1,2,3} and the parameters α,β,γ are real numbers. Then, we obtain the solutions of system of third-order difference equations in explicit form. In addition, the solutions according to some special cases of the parameters are examined. Finally, numerical examples are given to demonstrate the theoretical results.

Kaynakça

  • [1] Abo-Zeid R., Kamal H. Global behavior of two rational third order difference equations. Univers J Math Appl 2019; 2 (4): 212-217.
  • [2] Abo-Zeid R. Behavior of solutions of a second order rational difference equation. Math Morav 2019; 23(1): 11-25.
  • [3] Akrour Y, Kara M, Touafek N, Yazlik Y. Solutions formulas for some general systems of difference equations. Miskolc Math Notes 2021; 22(2): 529-555.
  • [4] Elaydi S. An Introduction to Difference Equations. Springer, New York, 1996.
  • [5] Elsayed EM. Solution for systems of difference equations of rational form of order two. Comput Appl Math 2014; 33(3): 751-765.
  • [6] Elsayed EM. Expression and behavior of the solutions of some rational recursive sequences. Math Metheod Appl Sci 2016; 39(18): 5682-5694.
  • [7] Halim Y, Touafek N, Yazlik Y. Dynamic behavior of a second-order non-linear rational difference equation. Turkish J Math 2015; 39(6): 1004-1018.
  • [8] Halim Y, Rabago JFT. On the solutions of a second-order difference equation in terms of generalized Padovan sequences. Math Slovaca 2018; 68(3): 625-638.
  • [9] Kara M, Yazlik Y. Solvability of a nonlinear three-dimensional system of difference equations with constant coefficients. Math Slovaca 2021; 71(5): 1133–1148.
  • [10] Kara M, Yazlik Y. Solutions formulas for three-dimensional difference equations system with constant coefficients. Turk J Math Comput Sci 2022; 14(1): 107–116.
  • [11] Stević S. Representation of solutions of bilinear difference equations in terms of generalized Fibonacci sequences. Electron J Qual Theory Differ Equ 2014; 67: 1–15.
  • [12] Taskara N, Tollu DT, Yazlik Y. Solutions of rational difference system of order three in terms of Padovan numbers. J Adv Res Appl Math 2015; 7(3): 18–29.
  • [13] Tollu DT, Yazlik Y, Taskara N. On a solvable nonlinear difference equation of higher order. Turkish J Math 2018; 42: 1765–1778.
  • [14] Touafek N, Elsayed EM. On a second order rational systems of difference equations. Hokkaido Math J 2015; 44: 29–45.
  • [15] Yazlik Y, Tollu DT, Taskara N. On the solutions of difference equation systems with Padovan numbers. Appl. Math 2013; 4: 15-20.

SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS

Yıl 2024, Cilt: 12 Sayı: 1, 62 - 74, 27.02.2024
https://doi.org/10.20290/estubtdb.1403701

Öz

In this study, we investigate the following four-dimensional difference equations system
{█(u_n=(αu_(n-3) t_(n-2)+β)/(γv_(n-1) t_(n-2) u_(n-3) ), @v_n=(αv_(n-3) u_(n-2)+β)/(γw_(n-1) u_(n-2) v_(n-3) ),n∈N_0,@w_n=(αw_(n-3) v_(n-2)+β)/(γt_(n-1) v_(n-2) w_(n-3) ), @t_n=(αt_(n-3) w_(n-2)+β)/(γu_(n-1) w_(n-2) t_(n-3) ), )┤
where the initial values u_(-d),v_(-d),w_(-d),t_(-d), d∈{1,2,3} and the parameters α,β,γ are real numbers. Then, we obtain the solutions of system of third-order difference equations in explicit form. In addition, the solutions according to some special cases of the parameters are examined. Finally, numerical examples are given to demonstrate the theoretical results.

Kaynakça

  • [1] Abo-Zeid R., Kamal H. Global behavior of two rational third order difference equations. Univers J Math Appl 2019; 2 (4): 212-217.
  • [2] Abo-Zeid R. Behavior of solutions of a second order rational difference equation. Math Morav 2019; 23(1): 11-25.
  • [3] Akrour Y, Kara M, Touafek N, Yazlik Y. Solutions formulas for some general systems of difference equations. Miskolc Math Notes 2021; 22(2): 529-555.
  • [4] Elaydi S. An Introduction to Difference Equations. Springer, New York, 1996.
  • [5] Elsayed EM. Solution for systems of difference equations of rational form of order two. Comput Appl Math 2014; 33(3): 751-765.
  • [6] Elsayed EM. Expression and behavior of the solutions of some rational recursive sequences. Math Metheod Appl Sci 2016; 39(18): 5682-5694.
  • [7] Halim Y, Touafek N, Yazlik Y. Dynamic behavior of a second-order non-linear rational difference equation. Turkish J Math 2015; 39(6): 1004-1018.
  • [8] Halim Y, Rabago JFT. On the solutions of a second-order difference equation in terms of generalized Padovan sequences. Math Slovaca 2018; 68(3): 625-638.
  • [9] Kara M, Yazlik Y. Solvability of a nonlinear three-dimensional system of difference equations with constant coefficients. Math Slovaca 2021; 71(5): 1133–1148.
  • [10] Kara M, Yazlik Y. Solutions formulas for three-dimensional difference equations system with constant coefficients. Turk J Math Comput Sci 2022; 14(1): 107–116.
  • [11] Stević S. Representation of solutions of bilinear difference equations in terms of generalized Fibonacci sequences. Electron J Qual Theory Differ Equ 2014; 67: 1–15.
  • [12] Taskara N, Tollu DT, Yazlik Y. Solutions of rational difference system of order three in terms of Padovan numbers. J Adv Res Appl Math 2015; 7(3): 18–29.
  • [13] Tollu DT, Yazlik Y, Taskara N. On a solvable nonlinear difference equation of higher order. Turkish J Math 2018; 42: 1765–1778.
  • [14] Touafek N, Elsayed EM. On a second order rational systems of difference equations. Hokkaido Math J 2015; 44: 29–45.
  • [15] Yazlik Y, Tollu DT, Taskara N. On the solutions of difference equation systems with Padovan numbers. Appl. Math 2013; 4: 15-20.
Toplam 15 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Adi Diferansiyel Denklemler, Fark Denklemleri ve Dinamik Sistemler
Bölüm Makaleler
Yazarlar

Şule Devecioğlu 0009-0003-0706-5421

Merve Kara 0000-0001-8081-0254

Yayımlanma Tarihi 27 Şubat 2024
Gönderilme Tarihi 12 Aralık 2023
Kabul Tarihi 15 Şubat 2024
Yayımlandığı Sayı Yıl 2024 Cilt: 12 Sayı: 1

Kaynak Göster

APA Devecioğlu, Ş., & Kara, M. (2024). SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS. Eskişehir Teknik Üniversitesi Bilim Ve Teknoloji Dergisi B - Teorik Bilimler, 12(1), 62-74. https://doi.org/10.20290/estubtdb.1403701
AMA Devecioğlu Ş, Kara M. SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS. Estuscience - Theory. Şubat 2024;12(1):62-74. doi:10.20290/estubtdb.1403701
Chicago Devecioğlu, Şule, ve Merve Kara. “SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS”. Eskişehir Teknik Üniversitesi Bilim Ve Teknoloji Dergisi B - Teorik Bilimler 12, sy. 1 (Şubat 2024): 62-74. https://doi.org/10.20290/estubtdb.1403701.
EndNote Devecioğlu Ş, Kara M (01 Şubat 2024) SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS. Eskişehir Teknik Üniversitesi Bilim ve Teknoloji Dergisi B - Teorik Bilimler 12 1 62–74.
IEEE Ş. Devecioğlu ve M. Kara, “SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS”, Estuscience - Theory, c. 12, sy. 1, ss. 62–74, 2024, doi: 10.20290/estubtdb.1403701.
ISNAD Devecioğlu, Şule - Kara, Merve. “SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS”. Eskişehir Teknik Üniversitesi Bilim ve Teknoloji Dergisi B - Teorik Bilimler 12/1 (Şubat 2024), 62-74. https://doi.org/10.20290/estubtdb.1403701.
JAMA Devecioğlu Ş, Kara M. SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS. Estuscience - Theory. 2024;12:62–74.
MLA Devecioğlu, Şule ve Merve Kara. “SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS”. Eskişehir Teknik Üniversitesi Bilim Ve Teknoloji Dergisi B - Teorik Bilimler, c. 12, sy. 1, 2024, ss. 62-74, doi:10.20290/estubtdb.1403701.
Vancouver Devecioğlu Ş, Kara M. SOLVABILITY OF A FOUR DIMENSIONAL SYSTEM OF DIFFERENCE EQUATIONS. Estuscience - Theory. 2024;12(1):62-74.