On the Diophantine Equation IN Cangül, M Demirci, G Soydan, N Tzanakis
arXiv preprint arXiv:1001.2525, 2010
43 2010 A brief survey on the generalized Lebesgue-Ramanujan-Nagell equation M Le, G Soydan
arXiv preprint arXiv:2001.09617, 2020
34 2020 On the diophantine equation x 2+ 2a· 3b· 11c= y n İ Cangül, M Demırcı, I Inam, F Luca, G Soydan
Mathematica Slovaca 63 (3), 647-659, 2013
32 2013 On the conjecture of Je\'smanowicz G Soydan, M Demirci, IN Cangul, A Togbé
arXiv preprint arXiv:1706.05480, 2017
26 2017 On the Diophantine equation x2+ 2a19b= yn G Soydan, M Ulas, H Zhu
Indian J. Pure Appl. Math 43 (3), 251-261, 2012
26 2012 On the Diophantine equation G Soydan
arXiv preprint arXiv:1701.02466, 2017
24 2017 On the Diophantine equation (x+ 1) k+(x+ 2) k+...+(2x) k= yn A Bérczes, I Pink, G Savaş, G Soydan
Journal of Number Theory 183, 326-351, 2018
19 2018 On the exponential Diophantine equation H Zhu, M Le, G Soydan, A Togbé
Periodica Mathematica Hungarica 70, 233-247, 2015
18 2015 RATIONAL POINTS ON ELLIPTIC CURVES y² = x³ + a³ IN F p WHERE p = 1 (mod 6) IS PRIME M Demirci, G Soydan, IN Cangul
The Rocky Mountain Journal of Mathematics, 1483-1491, 2007
13 2007 On the Diophantine equation E Kizildere, T Miyazaki, G SOYDAN
Turkish Journal of Mathematics 42 (5), 2690-2698, 2018
12 2018 Complete solution of the Diophantine equation x2+ 5a11b= yn G Soydan, N Tzanakis
Bull. Hellenic Math. Soc 60 (1), 125-151, 2016
10 2016 The Diophantine Equation Revisited D Bartoli, G Soydan
arXiv preprint arXiv:1909.06100, 2019
9 2019 On the Diophantine equation 2m+ nx2= yn F Luca, G Soydan
Journal of Number Theory 132 (11), 2604-2609, 2012
9 2012 On the Diophantine equation x^ 2+ 7^{alpha}. 11^{beta}= y^ n G Soydan
arXiv preprint arXiv:1201.0778, 2012
9 2012 An application of Baker’s method to the Jeśmanowicz’conjecture on primitive Pythagorean triples M Le, G Soydan
Periodica Mathematica Hungarica 80 (1), 74-80, 2020
8 2020 A note on the ternary purely exponential diophantine equation A x+ B y= C z with A+ B= C 2 E Kizildere, M Le, G Soydan
Studia Scientiarum Mathematicarum Hungarica 57 (2), 200-206, 2020
7 2020 On the Diophantine equation∑ k j= 1 jFp j= Fq n G Soydan, L Németh, L Szalay
Arch. Math.(Brno) 54, 177-188, 2018
7 2018 A p-adic look at the Diophantine equation x^{2}+ 11^{2k}= y^{n} IN Cangul, G Soydan, Y Simsek
arXiv preprint arXiv:1112.5984, 2011
7 2011 On a class of Lebesgue-Ljunggren-Nagell type equations A Dąbrowski, N Günhan, G Soydan
Journal of Number Theory 215, 149-159, 2020
6 2020 On the Diophantine equation $(5pn^{2}-1)^{x}+(p (p-5) n^{2}+ 1)^{y}=(pn)^{z} $ E Kızıldere, G Soydan
arXiv preprint arXiv:2002.11366, 2020
6 2020