1. To whom it may concern
J´anos Kurdics e-mail, skype:
j kurdics hu LinkedIn work: 31b
Sostoi Street Nyiregyhaza 4400 Hungary,
College of Nyiregyhaza, Inst of Mathe-
matics and Informatics
phone: +36-42-599400(2342) fax: +36-
42-402485
1 Education
• University of Debrecen, Hungary Doctor of Philosophy, mathematical
sciences, algebra; 1993 – 1997 no 8/1997.PhD
• University of Debrecen, Hungary Dipl Mathematician; 1984 – 1989
no 9/1989
• unofficial transcripts enclosed
2 Experience
Assignements
• College Professor (app by the Secretary of Education), College
of Nyiregyhaza 1999-Present
• College Dozent, College of Nyiregyhaza, 1995-1999
• College Senior Lecturer, College of Nyiregyhaza, 1993-1995
• College Teaching Assistant, College of Nyiregyhaza,1990-1993
• IT Assistant, Szolivall Debrecen, 1989-1990
Lectures: Introduction to algebra, Algebra I, Algebra II, Statistics, Numerical
linear algebra, Discrete Math, Probability Theory, Number Theory I,
Mathematics for Economics II
Seminars: Computer basics, MS Office service course, Computer algebra
systems I and II, Latex, Analysis I, Probability Theory, Statistics,
Introduction to algebra, Algebra I, Algebra II, Statistics, Linear algebra I,
Linear algebra II, Numerical linear algebra, Discrete Math, Number Theory
I, Special English, Mathematics for Economics II
Research: Author of several research papers, textbooks, contributed talks at
international research conferences, reviewer of Zentralblatt Karlsruhe, Top
contributor of Math Connection at LinkedIn
3 Computer Skills
Language: Maxima Lisp
Computer OS: Debian, Windows, virtualized Windows & Linux guests
Software: MS Excel, Maxima, TeX, GAP
2. 4 Publications
1. Kurdics, J., A note on connection properties, Acta Math. Acad.
Paed. Ny´ıregyh´aziensis 12 (1990), 57-60.
2. Kurdics, J., Sz´az, ´A., Connected relator spaces, Publ. Math.
Debrecen 40 (1992), 155-164. Zbl 0792.54027
3. Kurdics, J., Mala, J., Sz´az, ´A., Connectedness and well-chainedness
properties of symmetric covering relators, P.U.M.A. Ser. B 2. (1991),
189-197. Zbl 0794.54032
4. Kurdics, J. , Sz´az, ´A., Well-chained relator spaces, Kyungpook Math.
J. 32 (1992), 263-271. Zbl 0794.54031
5. Kurdics, J., Sz´az, ´A., Well-chainedness characterizations of
connected relators, Math. Pannonica 4 (1993), 37-45. Zbl 0814.54021
6. Kurdics, J. On group algebras with metabelian unit groups, Periodica
Math. Hung. 32 (1996), 57-64. Zbl 0857.20001
7. Kurdics, J., Engel properties of group algebras I, Publ. Math.
Debrecen 49 (1996), 183-192. Zbl 0862.16018
8. Kurdics, J., Engel properties of group algebras II, J. Pure Applied
Algebra 133 (1998), 179-196. Zbl 0947.16020
9. Kurdics, J. Properties of the unit group of a nonmodular group
algebra, Acta Math. Acad. Paed. Ny´ıregyh´aziensis 14 (1998), 37-39.
Zbl 0906.16015
10. B´odi, B., Kurdics, J., Lie properties of the group algebra and the
nilpotency class of its group of units, J. Algebra 212 (1999), 28-64.
Zbl 0936.16028
11. Kurdics, J., Diszkr´et matematika, college textbook, Bessenyei
Publisher, Ny´ıregyh´aza, 2006.
http://www.nyfjegyzetbolt.hu/product/cat/12
12. Kurdics, J., Algebrai alapismeretek, college textbook, Bessenyei
Publisher, Ny´ıregyh´aza, 2006.
http://www.nyfjegyzetbolt.hu/product/cat/12
3. 13. Kurdics, J., Algebra I, college textbook, Bessenyei Publisher,
Ny´ıregyh´aza, 2007.
http://www.nyfjegyzetbolt.hu/product/cat/12
14. Kurdics, J., Algebra II, college textbook, Bessenyei Publisher,
Ny´ıregyh´aza, 2008.
http://www.nyfjegyzetbolt.hu/product/cat/12
15. Kurdics, J., Statistics seminar, E-learning material,
http://moodle.nyf.hu/course/index.php?categoryid=60, 2008.
16. Kurdics, J., Numerical linear algebra seminar, E-learning material,
http://moodle.nyf.hu/course/index.php?categoryid=60, 2008.
17. Kurdics, J. et al., LaTeX seminar, E-learning material,
http://moodle.nyf.hu/course/index.php?categoryid=60, 2009.
18. Kurdics, J., Statistics lecture, E-learning material,
http://moodle.nyf.hu/course/index.php?categoryid=60, 2010.
19. Kurdics, J., Numerical linear algebra lecture, E-learning material,
http://moodle.nyf.hu/course/index.php?categoryid=60, 2010.
20. Kurdics, J., Automorphisms of a minimal nonabelian p-group with p
odd I, Glasnik Mat. 46(2) (2011), 367-383. Zbl 1242.20029
21. Kurdics, J., Proof of Cantor’s Continuum Hypothesis, Journal of
Hyperstructures 1 (2) (2012), 16-23.,
http://www.jhs-uma.com/index.php/JHSMS/article/view/41/9
22. Bagi´nski, Cz. and Kurdics, J., On the center of the modular group
algebra of a finite p-group.,J. Algebra Appl. 13(4), ID 1350127
(2014), pp. 11, http://doi.org/10.1142/S0219498813501272
23. Kurdics, J.,Algebra. Part I., LAP Lambert Academic Publishing,
Saarbr¨ucken (2014), pp. viii + 203, ISBN 978-3-659-62092-8,
zbMATH06370129, http://doi.org/10.13140/2.1.2645.6644
24. Kurdics, J., Reviews, 250+ pcs, Zentralblatt f¨ur Mathematik,
http://www.emis.de, Karlsruhe, 1996-2014
25. Kurdics, J., Automorphisms of a minimal nonabelian p-groups with p
odd II, Transactions on Algebra and its Applications 1 (1), 1-9.
(2015) http://www.talgap.com/index.php/taa/article/view/7/2