On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$

Mehmet Gümüş; Şeyma Irmak Eğilmez

doi:10.36753/mathenot.1243583

Araştırma Makalesi

Yıl 2023, Cilt: 11 Sayı: 1, 56 - 66, 28.03.2023

Mehmet Gümüş Şeyma Irmak Eğilmez

https://doi.org/10.36753/mathenot.1243583

Cited By: 1

Öz

Kaynakça

[1] Elsayed, E. M.: New method to obtain periodic solutions of period two and three of a rational difference equation. Nonlinear Dynamics. 79 (1), 241-250 (2014).
[2] Moaaz, O.: Comment on "new method to obtain periodic solutions of period two and three of a rational difference equation" [Nonlinear Dyn 79:241–250]. Nonlinear Dyn. 88, 1043-1049 (2017).
[3] Elaydi, S.: An introduction to difference equations. 3rd ed. Springer-Verlag. New York (2005).
[4] Kelley, W. G., Peterson, A. C.: Difference equations: An introduction with applications. Academic Press. New York (1991).
[5] Koci´c, V., Ladas, G.: Global behavior of non-linear difference equations of higher-order with applications. Kluwer Academic Publishers. Dordrecht (1993).
[6] Levin, S. A., May, R. M.: A note on difference-delay equations. Theoretical Population Biology. 9 (2), 178-187 (1976).
[7] Mickens, R. E.: Difference equations, theory and applications. Van Nostrand Rheinhold. (1990).
[8] Allen, L. J. S.: An introduction to mathematical biology. Pearson/Prentice Hall. New Jersey (2007).
[9] Murray, J. D.: Mathematical biology I: An introduction. 3rd ed. Springer. (2002).
[10] Pielou, E. C.: An introduction to mathematical ecology. Wiley Interscience. New York (1969).
[11] Oztepe, G. S.: An investigation on the Lasota-Wazewska model with a piecewise constant argument. Hacettepe Journal of Mathematics and Statistics. 50 (5), 1500-1508 (2021).
[12] Abo-Zeid, R.: Global attractivity of a higher-order difference equation. Discrete Dynamics in Nature and Society. 2012, 930410 (2012).
[13] Abo-Zeid, R.: Global behavior of a higher-order difference equation. Mathematica Slovaca. 64 (4), 931-940 (2014).
[14] Belhannache, F., Touafek, N., Abo-Zeid, R.: Dynamics of a third-order rational difference equation. Bulletin Mathematique de La Societe Des Sciences Mathematiques de Roumanie. 59(107) (1), 13-22 (2016).
[15] Gumus, M.: Global dynamics of solutions of a new class of rational difference equations. Konuralp Journal of Mathematics. 7 (2), 380-387 (2019).
[16] Gumus, M.: Analysis of periodicity for a new class of non-linear difference equations by using a new method. Electron. J. Math. Anal. Appl. 8, 109-116 (2020).
[17] Halim, Y., Touafek, N.,Yazlik, Y.: Dynamic behavior of a second-order non-linear rational difference equation. Turkish Journal of Mathematics. 39 (6), 1004-1018 (2015).
[18] Touafek, N., Halim, Y.: Global attractivity of a rational difference equation. Mathematical Sciences Letters. 2 (3), 161-165 (2013).
[19] Yalçınkaya, I.: On the difference equation xn+1 = + xn􀀀m=xk n: Discrete Dynamics in Nature and Society. 2008, 805460 (2008).
[20] Moaaz, O., Chalishajar, D., Bazighifan, O.: Some qualitative behavior of solutions of general class of difference equation. Mathematics. 7, 585 (2019).
[21] Moaaz, O.: Dynamics of difference equation xn+1 = f(xn􀀀l; xn􀀀k). Advances in Difference Equations. 2018, 447 (2018).
[22] Moaaz, O., Mahjoub, H., Muhib, A.: On the periodicity of general class of difference equations. Axioms. 9, 75 (2020).
[23] Abdelrahman, M. A. E.: On the difference equation zm+1 = f(zm; zm􀀀1; : : : ; zm􀀀k): Journal of Taibah University for Science. 13 (1), 1014-1021 (2019).
[24] Kulenovi´c, M. R. S., Ladas, G.: Dynamics of second-order rational difference equations. Chapman & Hall/CRC. (2001).
[25] Border, K. C.: Euler’s theorem for homogeneous function. Caltech Division of The Humanities and Social Sciences. 27, 16-34 (2017).
[26] Boulouh, M., Touafek, N., Tollu, D. T.: On the behavior of the solutions of an abstract system of difference equations. Journal of Applied Mathematics and Computing. 68, 2937-2969 (2022).

On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$

Yıl 2023, Cilt: 11 Sayı: 1, 56 - 66, 28.03.2023

Mehmet Gümüş Şeyma Irmak Eğilmez

https://doi.org/10.36753/mathenot.1243583

Cited By: 1

Öz

In this paper, we aim to investigate the qualitative behavior of a general class of non-linear difference equations. That is, the prime period two solutions, the prime period three solutions and the stability character are examined. We also use a new technique introduced in [1] by E. M. Elsayed and later developed by O. Moaaz in [2] to examine the existence of periodic solutions of these general equations. Moreover, we use homogeneous functions for the investigation of the dynamics of the aforementioned equations.

Anahtar Kelimeler

Homogeneous function, difference equation, periodicity, qualitative behavior, stability., Homogeneous function, difference equation, periodicity, qualitative behavior, stability.

Kaynakça

[1] Elsayed, E. M.: New method to obtain periodic solutions of period two and three of a rational difference equation. Nonlinear Dynamics. 79 (1), 241-250 (2014).
[2] Moaaz, O.: Comment on "new method to obtain periodic solutions of period two and three of a rational difference equation" [Nonlinear Dyn 79:241–250]. Nonlinear Dyn. 88, 1043-1049 (2017).
[3] Elaydi, S.: An introduction to difference equations. 3rd ed. Springer-Verlag. New York (2005).
[4] Kelley, W. G., Peterson, A. C.: Difference equations: An introduction with applications. Academic Press. New York (1991).
[5] Koci´c, V., Ladas, G.: Global behavior of non-linear difference equations of higher-order with applications. Kluwer Academic Publishers. Dordrecht (1993).
[6] Levin, S. A., May, R. M.: A note on difference-delay equations. Theoretical Population Biology. 9 (2), 178-187 (1976).
[7] Mickens, R. E.: Difference equations, theory and applications. Van Nostrand Rheinhold. (1990).
[8] Allen, L. J. S.: An introduction to mathematical biology. Pearson/Prentice Hall. New Jersey (2007).
[9] Murray, J. D.: Mathematical biology I: An introduction. 3rd ed. Springer. (2002).
[10] Pielou, E. C.: An introduction to mathematical ecology. Wiley Interscience. New York (1969).
[11] Oztepe, G. S.: An investigation on the Lasota-Wazewska model with a piecewise constant argument. Hacettepe Journal of Mathematics and Statistics. 50 (5), 1500-1508 (2021).
[12] Abo-Zeid, R.: Global attractivity of a higher-order difference equation. Discrete Dynamics in Nature and Society. 2012, 930410 (2012).
[13] Abo-Zeid, R.: Global behavior of a higher-order difference equation. Mathematica Slovaca. 64 (4), 931-940 (2014).
[14] Belhannache, F., Touafek, N., Abo-Zeid, R.: Dynamics of a third-order rational difference equation. Bulletin Mathematique de La Societe Des Sciences Mathematiques de Roumanie. 59(107) (1), 13-22 (2016).
[15] Gumus, M.: Global dynamics of solutions of a new class of rational difference equations. Konuralp Journal of Mathematics. 7 (2), 380-387 (2019).
[16] Gumus, M.: Analysis of periodicity for a new class of non-linear difference equations by using a new method. Electron. J. Math. Anal. Appl. 8, 109-116 (2020).
[17] Halim, Y., Touafek, N.,Yazlik, Y.: Dynamic behavior of a second-order non-linear rational difference equation. Turkish Journal of Mathematics. 39 (6), 1004-1018 (2015).
[18] Touafek, N., Halim, Y.: Global attractivity of a rational difference equation. Mathematical Sciences Letters. 2 (3), 161-165 (2013).
[19] Yalçınkaya, I.: On the difference equation xn+1 = + xn􀀀m=xk n: Discrete Dynamics in Nature and Society. 2008, 805460 (2008).
[20] Moaaz, O., Chalishajar, D., Bazighifan, O.: Some qualitative behavior of solutions of general class of difference equation. Mathematics. 7, 585 (2019).
[21] Moaaz, O.: Dynamics of difference equation xn+1 = f(xn􀀀l; xn􀀀k). Advances in Difference Equations. 2018, 447 (2018).
[22] Moaaz, O., Mahjoub, H., Muhib, A.: On the periodicity of general class of difference equations. Axioms. 9, 75 (2020).
[23] Abdelrahman, M. A. E.: On the difference equation zm+1 = f(zm; zm􀀀1; : : : ; zm􀀀k): Journal of Taibah University for Science. 13 (1), 1014-1021 (2019).
[24] Kulenovi´c, M. R. S., Ladas, G.: Dynamics of second-order rational difference equations. Chapman & Hall/CRC. (2001).
[25] Border, K. C.: Euler’s theorem for homogeneous function. Caltech Division of The Humanities and Social Sciences. 27, 16-34 (2017).
[26] Boulouh, M., Touafek, N., Tollu, D. T.: On the behavior of the solutions of an abstract system of difference equations. Journal of Applied Mathematics and Computing. 68, 2937-2969 (2022).

Toplam 26 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Matematik
Bölüm	Articles
Yazarlar	Mehmet Gümüş 0000-0002-7447-479X Şeyma Irmak Eğilmez 0000-0003-1781-5399
Yayımlanma Tarihi	28 Mart 2023
Gönderilme Tarihi	27 Ocak 2023
Kabul Tarihi	11 Mart 2023
Yayımlandığı Sayı	Yıl 2023 Cilt: 11 Sayı: 1

Kaynak Göster

APA	Gümüş, M., & Eğilmez, Ş. I. (2023). On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$. Mathematical Sciences and Applications E-Notes, 11(1), 56-66. https://doi.org/10.36753/mathenot.1243583
AMA	Gümüş M, Eğilmez ŞI. On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$. Math. Sci. Appl. E-Notes. Mart 2023;11(1):56-66. doi:10.36753/mathenot.1243583
Chicago	Gümüş, Mehmet, ve Şeyma Irmak Eğilmez. “On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$”. Mathematical Sciences and Applications E-Notes 11, sy. 1 (Mart 2023): 56-66. https://doi.org/10.36753/mathenot.1243583.
EndNote	Gümüş M, Eğilmez ŞI (01 Mart 2023) On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$. Mathematical Sciences and Applications E-Notes 11 1 56–66.
IEEE	M. Gümüş ve Ş. I. Eğilmez, “On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$”, Math. Sci. Appl. E-Notes, c. 11, sy. 1, ss. 56–66, 2023, doi: 10.36753/mathenot.1243583.
ISNAD	Gümüş, Mehmet - Eğilmez, Şeyma Irmak. “On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$”. Mathematical Sciences and Applications E-Notes 11/1 (Mart 2023), 56-66. https://doi.org/10.36753/mathenot.1243583.
JAMA	Gümüş M, Eğilmez ŞI. On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$. Math. Sci. Appl. E-Notes. 2023;11:56–66.
MLA	Gümüş, Mehmet ve Şeyma Irmak Eğilmez. “On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$”. Mathematical Sciences and Applications E-Notes, c. 11, sy. 1, 2023, ss. 56-66, doi:10.36753/mathenot.1243583.
Vancouver	Gümüş M, Eğilmez ŞI. On the Qualitative Behavior of the Difference Equation $\delta _{m+1}=\omega +\zeta \frac{f(\delta _{m},\delta _{m-1})}{\delta _{m-1}^{\beta}}$. Math. Sci. Appl. E-Notes. 2023;11(1):56-6.

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