Tudóstér: Pink István publikációi

Miyazaki, T., Pink, I.: Number of solutions to a special type of unit equations in two unknowns.
ajm. 146 (2), 295-369, 2024.

Miyazaki, T., Pink, I.: Number of solutions to a special type of unit equations in two unknowns, II.
Res. number theory. 10 (2), 1-41, 2024.

Bérczes, A., Hajdu, L., Luca, F., Pink, I.: Additive Diophantine Equations with Binary Recurrences, S-Units and Several Factorials.
Results Math. 78 (4), 1-32, 2023.

Bérczes, A., Le, M., Pink, I., Soydan, G.: A note on the ternary Diophantine equation x^2-y^{2m}=z^n.
An. St. Univ. Ovidius Constanta, Ser. Mat. 29 (2), 93-105, 2021.

Bazsó, A., Bérczes, A., Kolouch, O., Pink, I., Šustek, J.: Diophantine equations connected to the Komornik polynomials.
Glas. Mat. 55 (1), 13-27, 2020.

Bérczes, A., Hajdu, L., Pink, I., Rout, S.: Sums of S-units in recurrence sequences.
J. Number Theory. 196 353-363, 2019.

Pink, I., Ziegler, V.: Effective resolution of Diophantine equations of the form un+um=wpz11?pzss.
Monatsh. Math. 185 (1), 103-131, 2018.

Pink, I., Szikszai, M.: A Brocard-Ramanujan-type equation with Lucas and associated Lucas sequences.
Glas. Mat. 52 (1), 11-21, 2017.

Bertók, C., Hajdu, L., Pink, I., Rábai, Z.: Linear combinations of prime powers in binary recurrence sequences.
Int. J. Number Theory. 13 (261), [1-12], 2017.

Chim, K., Pink, I., Ziegler, V.: On a variant of Pillai's problem.
Int. J. Number Theory. 13 (07), 1711-1727, 2017.

Bérczes, A., Luca, F., Pink, I., Ziegler, V.: Finiteness results for Diophantine triples with repdigit values.
Acta Arith. 172 (2), 133-148, 2016.

Bérczes, A., Hajdu, L., Miyazaki, T., Pink, I.: On the Diophantine equation 1+x^a+z^b=y^n.
J. Comb. Number Theory. 8 (2), 145-154, 2016.

Bérczes, A., Hajdu, L., Miyazaki, T., Pink, I.: On the equation 1^k+2^k+...+x^k=y^n for fixed x.
J. Number Theory. 163 43-60, 2016.

Bazsó, A., Pink, I.: Diophantine equations with Appell sequences.
Period. Math. Hung. 69 (2), 222-230, 2014.

Bérczes, A., Pink, I.: On generalized Lebesgue-Ramanujan-Nagell equations.
. 22 (1), 51-71, 2014.

Hajdu, L., Pink, I.: On the Diophantine equation 1+2^a+x^b=y^n.
J. Number Theory. 143 1-13, 2014.

He, B., Pink, I., Pintér, Á., Togbé, A.: On the Diophantine inequality |X^2-cXY^2+Y^4|<=c+2.
Glas. Mat. 48 (2), 291-299, 2013.

Bennett, M., Pink, I., Rábai, Z.: On the number of solutions of binomial Thue inequalities.
Publ. Math. Debr. 83 (1-2), 241-256, 2013.

Rábai, Z., Bennett, M., Pink, I.: On the number of solutions of binomial Thue inequalities.
Electron. Notes Discret. Math. 43 299-304, 2013.

Bérczes, A., Pink, I.: On the Diophantine equation x^2+d^{2l+1}=y^n.
Glasg. Math. J. 54 (02), 415-428, 2012.

Pink, I., Rábai, Z.: On the diophantine equation x^2+5^k17^l=y^n.
Commun. Math. 19 (1), 1-9, 2011.

Bérczes, A., Liptai, K., Pink, I.: On balancing recurrence sequences.
Fibonacci Q. 48 (2), 121-128, 2010.

Bérczes, A., Liptai, K., Pink, I.: On generalized balancing sequences.
Fibonacci Q. 48 (2), 121-128, 2010.

Bérczes, A., Pink, I.: On the Diophantine equation x2 + p2k = yn.
Arch. Math. 91 (6), 2008.

Pink, I.: On the diophantine equation x2+2alpha3betha5gamma7delta=yn.
Publ. Math. Debrecen. 70 149-166, 2007.

Győry, K., Pink, I., Pintér, Á.: Power values of polynomials and binomial Thue-Mahler equations.
Publ. Math. Debr. 65 (3-4), 341-362, 2004.

Pink, I., Tengely, S.: Full powers in arithmetic progressions.
Publ. Math. Debr. 57 (3-4), 535-545, 2000.