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Curriculum vitae
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born: Nagykároly, 2 July 1973
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secondary school: Secondary
School, Nagykároly, 1988-1990 and András Péter Grammar School,
Szeghalom, 1990-1992
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university studies:
mathematician, mathematics teacher, Lajos Kossuth University, 1993-1998
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PhD scholarship: 1998-2001
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assistant: 2001-2002
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assistant
lecturer: 2002-2010
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assistant
professor: since 2010
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PhD degree:
2006
title of the thesis: Effective results in the theory of superelliptic
equations (in Hungarian)
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knowledge
of languages:
German (intermediate)
Publications
[1] I. Pink and Sz. Tengely,
Full powers in arithmetic progressions, Publ. Math. Debrecen 57 (2000),
535-545.
[2] I. Pink, On the differences between polynomial values and perfect
powers, Publ. Math. Debrecen 63 (2003), 461-472.
[3] I. Pink, On the diophantine equation x2+(p1z_1…psz_s)2=2yn,
Publ. Math. Debrecen 65 (2004), 205-213.
[4] K. Győry, I.
Pink and A. Pintér, Power values of polynomials and binomial Thue-Mahler
equations, Publ. Math. Debrecen
65 (2004), 341-362.
[5] I. Pink,
Effective results in the
theory of superelliptic equations (in Hungarian), PhD thesis, University
of Debrecen, 2006.
[6] I. Pink, On the diophantine equation x2+2α3β5γ7δ=yn,
Publ. Math. Debrecen
70 (2007), 149-166.
[7] A. Bérczes and I. Pink, On the diophantine equation x2+p2k=yn,
Archiv der Mathematik 91 (2008), 505-517.
[8] A. Bérczes, K. Liptai and I. Pink, On balancing recurrence sequences,
Fibonacci Quart. 48 (2010), 121-128.
[9] I. Pink and Zs. Rábai, On the diophantine equation x2+5k17l=yn,
Communications in Mathematics 19 (2011), 1-9.
[10] A. Bérczes and I. Pink, On the diophantine equation x2+d2l+1=yn,
Glasgow Math. J., accepted.
Talks
[1] On the difference
|F(x)-bym|,
The 15th Czech and Slovak International Conference on Number Theory,
3-8 September 2001, Ostravice (Czech Republic).
[2] On the differences between polynomial values and perfect powers,
Explicit Algebraic Number Theory: NWO-OTKA Workshop, 27 September-2 October 2002, Leiden
(Netherlands).
[3] On the differences between polynomial values and perfect powers (in
Hungarian), Conference on Number Theory to the Memory of Péter Kiss,
22-23 November 2002, Eger.
[4] Full powers and
binomial Thue-Mahler equations (in
Hungarian),
Diophantine Day
in Sopron, 9 October 2004, Sopron.
[5] On the diophantine equation x2+2α3β5γ7δ=yn
(in Hungarian),
Cryptography and Diophantine Day in Nyíregyháza, 30 April
2005, Nyíregyháza.
[6] On the diophantine equation x2+2α3β5γ7δ=yn,
The 17th Czech and Slovak International Conference on Number Theory,
3-8 September 2005, Malenovice (Czech Republic).
[7] On the diophantine equation x2+2α3β5γ7δ=yn
(in Hungarian),
Diophantine and Cryptography
Days in Berekfürdő, 22 April 2006, Berekfürdő.
[8] On the equation
x2+pl=yn (in Hungarian),
Number Theory and Cryptography
Days in Eger, 6 October 2007, Eger.
[9] On the diophantine equation x2+p2k=yn,
Winter School on Explicit Methods in Number Theory, 26-30 January 2009,
Debrecen.
[10] On the diophantine equation x2+d2l+1=yn,
Number Theory and its Applications, An International Conference Dedicated
to Kálmán Győry, Attila Pethő, János Pintz and András Sárközy, 4-8
October 2010, Debrecen.
[11] On the number of solutions of some binomial Thue equations, Paul
Turán Memorial Conference, 22-26 August 2011, Budapest.
[12] On the number of solutions of some binomial Thue equations I, The
20th Czech and
Slovak International Conference on Number Theory, 5-9 September 2011, Stará
Lesná (Slovakia). |
