Araştırma Makalesi
Yıl 2024,
Cilt: 7 Sayı: 4, 199 - 211, 31.12.2024
Öz
Kaynakça
- W. Sierpinski, On the equation $3^x +4^y =5^z$, Wiad. Mat., 1 (1956), 194–195.
- L. Jesmanowicz, Several remarks on Pythagorean numbers, Wiad. Mat., 1(2) (1955), 196–202.
- N. Terai, The Diophantine equation $a^x+b^y=c^z$, Proc. Japan Acad. Ser. A Math. Sci., 70 (1994), 22-26.
- N. Terai, T. Hibino, \emph{On the exponential Diophantine equation}, Int. J. Algebra, 6(23) (2012), 1135–1146.
- T. Miyazaki, N. Terai, On the exponential Diophantine equation, Bull. Aust. Math. Soc., 90(1) (2014), 9–19.
- N. Terai, T. Hibino, On the exponential Diophantine equation $(12m^2+ 1)^x+(13m^2- 1)^y=(5m)^z$, Int. J. Algebra, 9(6) (2015), 261–272.
- R. Fu, H. Yang, On the exponential Diophantine equation, Period. Math. Hungar., 75(2) (2017), 143–149.
- X. Pan, A note on the exponential Diophantine equation, Colloq. Math., 149 (2017), 265–273.
- M. Alan, On the exponential Diophantine equation $(18m^2+1)^x+(7m^2−1)^y= (5m)^z$, Turkish J. Math., 42(4) (2018), 1990-1999.
- E. Kizildere, T. Miyazaki, G. Soydan, On the Diophantine equation $((c +1)m^2+ 1)^x+(cm^2-1)^y= (am)^z$, Turkish J. Math., 42,(5) (2018), 2690–2698.
- N.J. Deng, D.Y. Wu, P.Z. Yuan, The exponential Diophantine equation $(3am^2-1)^x+(a(a-3)m^2+1)^y=(am)^z$, Turkish J. Math., 43(5) (2019), 2561 – 2567.
- N. Terai, On the exponential Diophantine equation, Ann. Math. Inform., 52 (2020), 243–253.
- E. Kızıldere, G. Soydan, On the Diophantine equation $(5pn^2−1)^x+(p(p−5)n^2+1)^y=(pn)^z$, Honam Math. J., 42 (2020), 139–150.
- N. Terai, Y. Shinsho, On the exponential Diophantine equation $(3m^2 +1)^x +(qm^2-1)^y = (rm)^z$, SUT J. Math., 56 (2020) 147-158.
- N. Terai, Y. Shinsho, On the exponential Diophantine equation $(4m^2 +1)^x +(45m^2-1)^y = (7m)^z$, Int. J. Algebra, 15(4) (2021), 233-241.
- M. Alan, R.G. Biratlı, On the exponential Diophantine equation $(6m^2 +1)^x+(3m^2 −1)^y = (3m)^z$, Fundam. J. Math. Appl., 5(3) (2022), 174-180.
- S. Fei, J. Luo, A Note on the Exponential Diophantine Equation $(rlm^2-1)^x+(r (r-l) m^2+ 1)^y=(rm)^z$, Bull. Braz. Math. Soc. (N.S.), 53 (2022), 1499-1517.
- E. Hasanalizade, A note on the exponential Diophantine equation $(44m + 1)^x+ (5m - 1)^ y= (7m)^z$, Integers, 23 (2023), 1.
- T. Çokoksen, M. Alan, On the Diophantine equation $(9d^2 + 1)^x + (16d^2 − 1)^y = (5d)^z$ Regarding Terai's Conjecture, J. New Theory, 47 (2024), 72-84.
- A. Çağman, Repdigits as sums of three Half-companion Pell numbers}, Miskolc Math. Notes, 24(2) (2023), 687-697.
- A. Çağman, K. Polat, On a Diophantine equation related to the difference of two Pell numbers, Contrib. Math., 3 (2021), 37-42.
- A. Çağman, Explicit Solutions of Powers of Three as Sums of Three Pell Numbers Based on Baker’s Type Inequalities, TJI, 5(1) (2021), 93-103.
- M. Le, Some exponential Diophantine equations. I. The equation $d_1x^2- d_2y^2=\lambda k^z$, J. Number Theory, 55 (1995), 209-221.
- Y. Bugeaud, T. Shorey, On the number of solutions of the generalized Ramanujan-Nagell equation, J. Reine Angew. Math., 539 (2001), 55-74.
- Y. Bilu, G. Hanrot, P. M. Voutier, Existence of primitive divisors of Lucas and Lehmer numbers, J. Reine Angew. Math., 539 (2001), 75-122.
- P. M. Voutier, Primitive divisors of Lucas and Lehmer sequences, Math. Comp., 64 (1995), 869-888.
- K. Zsigmondy, Zur Theorie der Potenzreste, Monatsh. Math., 3 (1892), 265–284.
- L. K. Hua, Introduction to Number Theory, Science Publishing Co, (1957).
- J. H. E. Cohn, Square Fibonacci numbers, J. Lond. Math. Soc. (2), (1964), 109-113.
Yıl 2024,
Cilt: 7 Sayı: 4, 199 - 211, 31.12.2024
Öz
This study establishes that the sole positive integer solution to the exponential Diophantine equation $(8r^2+1)^x+(r^2-1)^y=(3r)^z$ is $(x,y,z)=(1,1,2)$ for all $r>1$. The proof employs elementary techniques from number theory, a classification method, and Zsigmondy's Primitive Divisor Theorem.
Anahtar Kelimeler
Diophantine equations Primitive divisor theorem Terai’s conjecture
Kaynakça
- W. Sierpinski, On the equation $3^x +4^y =5^z$, Wiad. Mat., 1 (1956), 194–195.
- L. Jesmanowicz, Several remarks on Pythagorean numbers, Wiad. Mat., 1(2) (1955), 196–202.
- N. Terai, The Diophantine equation $a^x+b^y=c^z$, Proc. Japan Acad. Ser. A Math. Sci., 70 (1994), 22-26.
- N. Terai, T. Hibino, \emph{On the exponential Diophantine equation}, Int. J. Algebra, 6(23) (2012), 1135–1146.
- T. Miyazaki, N. Terai, On the exponential Diophantine equation, Bull. Aust. Math. Soc., 90(1) (2014), 9–19.
- N. Terai, T. Hibino, On the exponential Diophantine equation $(12m^2+ 1)^x+(13m^2- 1)^y=(5m)^z$, Int. J. Algebra, 9(6) (2015), 261–272.
- R. Fu, H. Yang, On the exponential Diophantine equation, Period. Math. Hungar., 75(2) (2017), 143–149.
- X. Pan, A note on the exponential Diophantine equation, Colloq. Math., 149 (2017), 265–273.
- M. Alan, On the exponential Diophantine equation $(18m^2+1)^x+(7m^2−1)^y= (5m)^z$, Turkish J. Math., 42(4) (2018), 1990-1999.
- E. Kizildere, T. Miyazaki, G. Soydan, On the Diophantine equation $((c +1)m^2+ 1)^x+(cm^2-1)^y= (am)^z$, Turkish J. Math., 42,(5) (2018), 2690–2698.
- N.J. Deng, D.Y. Wu, P.Z. Yuan, The exponential Diophantine equation $(3am^2-1)^x+(a(a-3)m^2+1)^y=(am)^z$, Turkish J. Math., 43(5) (2019), 2561 – 2567.
- N. Terai, On the exponential Diophantine equation, Ann. Math. Inform., 52 (2020), 243–253.
- E. Kızıldere, G. Soydan, On the Diophantine equation $(5pn^2−1)^x+(p(p−5)n^2+1)^y=(pn)^z$, Honam Math. J., 42 (2020), 139–150.
- N. Terai, Y. Shinsho, On the exponential Diophantine equation $(3m^2 +1)^x +(qm^2-1)^y = (rm)^z$, SUT J. Math., 56 (2020) 147-158.
- N. Terai, Y. Shinsho, On the exponential Diophantine equation $(4m^2 +1)^x +(45m^2-1)^y = (7m)^z$, Int. J. Algebra, 15(4) (2021), 233-241.
- M. Alan, R.G. Biratlı, On the exponential Diophantine equation $(6m^2 +1)^x+(3m^2 −1)^y = (3m)^z$, Fundam. J. Math. Appl., 5(3) (2022), 174-180.
- S. Fei, J. Luo, A Note on the Exponential Diophantine Equation $(rlm^2-1)^x+(r (r-l) m^2+ 1)^y=(rm)^z$, Bull. Braz. Math. Soc. (N.S.), 53 (2022), 1499-1517.
- E. Hasanalizade, A note on the exponential Diophantine equation $(44m + 1)^x+ (5m - 1)^ y= (7m)^z$, Integers, 23 (2023), 1.
- T. Çokoksen, M. Alan, On the Diophantine equation $(9d^2 + 1)^x + (16d^2 − 1)^y = (5d)^z$ Regarding Terai's Conjecture, J. New Theory, 47 (2024), 72-84.
- A. Çağman, Repdigits as sums of three Half-companion Pell numbers}, Miskolc Math. Notes, 24(2) (2023), 687-697.
- A. Çağman, K. Polat, On a Diophantine equation related to the difference of two Pell numbers, Contrib. Math., 3 (2021), 37-42.
- A. Çağman, Explicit Solutions of Powers of Three as Sums of Three Pell Numbers Based on Baker’s Type Inequalities, TJI, 5(1) (2021), 93-103.
- M. Le, Some exponential Diophantine equations. I. The equation $d_1x^2- d_2y^2=\lambda k^z$, J. Number Theory, 55 (1995), 209-221.
- Y. Bugeaud, T. Shorey, On the number of solutions of the generalized Ramanujan-Nagell equation, J. Reine Angew. Math., 539 (2001), 55-74.
- Y. Bilu, G. Hanrot, P. M. Voutier, Existence of primitive divisors of Lucas and Lehmer numbers, J. Reine Angew. Math., 539 (2001), 75-122.
- P. M. Voutier, Primitive divisors of Lucas and Lehmer sequences, Math. Comp., 64 (1995), 869-888.
- K. Zsigmondy, Zur Theorie der Potenzreste, Monatsh. Math., 3 (1892), 265–284.
- L. K. Hua, Introduction to Number Theory, Science Publishing Co, (1957).
- J. H. E. Cohn, Square Fibonacci numbers, J. Lond. Math. Soc. (2), (1964), 109-113.
Toplam 29 adet kaynakça vardır.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Temel Matematik (Diğer) |
| Bölüm | Makaleler |
| Yazarlar | |
| Erken Görünüm Tarihi | 12 Aralık 2024 |
| Yayımlanma Tarihi | 31 Aralık 2024 |
| Gönderilme Tarihi | 5 Ekim 2024 |
| Kabul Tarihi | 9 Aralık 2024 |
| Yayımlandığı Sayı | Yıl 2024 Cilt: 7 Sayı: 4 |
Kaynak Göster
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