1. E. W. Kiss, On modular right ideals of a ring. Acta Math. Acad. Sci. Hung., 30 (1977), 303-306.
2. E. W. Kiss, A module-theoretic characterization of rings with unity. Acta Math. Acad. Sci. Hung., 31 (1978), 345-348.
3. E. W. Kiss, L. Rónyai, On rings having a special type of subring lattice. Acta Math. Acad. Sci. Hung, 37 (1981), 223-234.
4. E. W. Kiss, Each Hamiltonian variety has the congruence extension property. Algebra Universalis, 12 (1981), 395-398.
5. B. Biró, E. W. Kiss, P. P. Pálfy, On the congruence extension property. Universal Algebra (Proc. Conf. Esztergom, 1977), Coll. Math. Soc. J. Bolyai, 29 (1982), 129-151.
6. B. Biró, E. W. Kiss, P. P. Pálfy, On the congruence extension property, Research Announcement. Semigroup Forum, 15 (1877/78), 183-184.
7. E. Fried, E. W. Kiss, Connection between congruence lattices and polynomial properties. Algebra Universalis, 17 (1983), 227-262.
8. E. W. Kiss, Finitely Boolean representable varieties. Proc. Amer. Math. Soc., 89 (1983), 579-582.
9. E. W. Kiss, Complemented and skew congruences. Ann. Univ. Ferrara, Sez. Mat., XXIX (1983), 111-127.
10. E. W. Kiss, L. Márki, P. Prőhle, W. Tholen, Categorical algebraic properties. A compendium on amalgamation, congruence extension, epimorphisms, residual smallness, and injectivity. Studia Sci. Math. Hungarica, 18 (1983), 79-141.
11. E. W. Kiss, Term functions and subalgebras. Acta Sci. Math. (Szeged), 47 (1984), 303-306.
12. E. W. Kiss, A note on varieties of graph algebras. Proceedings of the Charleston Conference on Universal Algebra, 1984, Springer Lecture Notes series, 1149 163-166.
13. E. W. Kiss, Injectivity and related concepts in modular varieties. I. Two commutator properties. Bull. Austral. Math. Soc., 32 (1985), 33-44.
14. E. W. Kiss, Injectivity and related concepts in modular varieties. II. The congruence extension property. Bull. Austral. Math. Soc., 32 (1985), 45-53.
15. E. W. Kiss, Definable principal congruences in congruence distributive varieties. Algebra Universalis, 21 (1985), 213-224.
16. E. W. Kiss, Boolean products and subdirect powers. Algebra Universalis, 21 (1985), 312-314.
17. G. Grätzer, E. W. Kiss, A construction of semimodular lattices. Order, 2 (1986), 351-365.
18. A. Day, E. W. Kiss, Frames and rings in congruence modular varieties. Journal of Algebra, 109 (1987), 479-507.
19. E. W. Kiss, R. Pöschel, P. Prőhle, Subvarieties of varieties generated by graph algebras. Acta Sci. Math., 54 (1990), 57-75.
20. E. W. Kiss, M. A. Valeriote, Strongly Abelian varieties and the Hamiltonian property. Canadian J. Math., 43 (2) (1991), 331-346.

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21. E. W. Kiss, Three remarks on the modular commutator. Algebra Universalis, 29 (1992), 455-476.

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22. E. W. Kiss, P. Prőhle, Problems and results in tame congruence theory. Algebra Universalis, 29 (1992), 151-171.

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23. E. W. Kiss, On the Loewy-rank of infinite algebras. Algebra Universalis, 29 (1992), 437-440.

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24. J. Berman, E. W. Kiss, P. Prőhle, Á. Szendrei, The set of types of a finitely generated variety. Discrete Math., 112 (1993), 1-20.

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25. E. W. Kiss, M. A. Valeriote, Abelian algebras and the Hamiltonian property. Journal of Pure and Applied Algebra, 87 (1993), 37-49.

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26. E. W. Kiss, S. Vovsi, Critical algebras and the Frattini congruence. Algebra Universalis, 34 (1995), 336-344.

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27. E. W. Kiss, An easy way to minimal algebras. International Journal of Algebra and Computation, 7 (1997), 55-75.

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28. E. W. Kiss, An introduction to tame congruence theory. Proceedings of the 1996 NATO ASI Workshop on Algebraic Model Theory, 119-143, Kluwer, 1997.

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29. K. A. Kearnes, E. W. Kiss, M. A. Valeriote, Minimal sets and varieties. Trans. Amer. Math. Soc. 350 (1998), 1-41.

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30. E. W. Kiss, P. P. Pálfy, A lattice of normal subgroups that is not embeddable into the subgroup lattice of an Abelian group. Mathematica Scandinavica 83 (1998), 169-176.
31. K. A. Kearnes, E. W. Kiss, Modularity prevents tails. Proc. Amer. Math. Soc. 127 (1999), 11-19.

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32. K. A. Kearnes, E. W. Kiss, Finite algebras of finite complexity. Discrete Math. 207 (1999), 89-135.

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33. K. A. Kearnes, E. W. Kiss, M. A. Valeriote, A geometric consequence of residual smallness. Annals of Pure and Applied Logic 99 (1999), 137-169.

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34. K. A. Kearnes, E. W. Kiss, Left and right nilpotence degree are independent. Contributions to General Algebra 13 (Velké Karlovice, 1999/Dresden, 2000), Verlag Johannes Heyn, Klagenfurt (2001), 189-198.

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35. K. A. Kearnes, E. W. Kiss, Á. Szendrei, R. D. Willard, Chief factor sizes in finitely generated varieties. Canadian Journal of Mathematics 54 (2002), 736-756.

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36. K. A. Kearnes, E. W. Kiss, Residual smallness and weak centrality. International Journal of Algebra and Computation 13 (2003), 35-59.

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37. K. A. Kearnes, E. W. Kiss, The triangular principle is equivalent to the triangular scheme. Algebra Universalis 54 (2005), 373-383.

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38. E. W. Kiss, M. A. Valeriote, On tractability and congruence distributivity. Logical Methods in Computer Science, 3 (2:6, 2007), 20 pages.

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39. Pawel M. Idziak, Keith A. Kearnes, Emil W. Kiss, Matthew A. Valeriote, Definable principal congruences and solvability. Annals of Pure and Applied Logic, 157 (2009), 30-49.

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40. Lee M. Goswick, Emil W. Kiss, Gábor Moussong, Nándor Simányi, Sums of squares and orthogonal integral vectors. Journal of Number Theory, 132 (2012), 37-53.

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    Lecture in Linz, 2008: presentation; printable.

    Lecture in Szeged, 2009: presentation; printable.

41. Emil W. Kiss, Péter Kutas, Cubes of integral vectors in dimension four. Studia Sci. Math. Hun. 49/4 (2012), 525-537.

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42. Keith A. Kearnes, Emil W. Kiss, The shape of congruence lattices. Memoirs of the AMS, 222 (2013), no. 1046, 214 pages.

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    Lecture in Szeged, 2009: Mal’tsev conditions and centrality.

43. Gábor Czédli, Emil W. Kiss, Varieties whose tolerances are images of congruences. Bulletin of the Australian Mathematical Society, 87 (2013), 326-338, doi:10.1017/S0004972712000603.

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    Lecture in Szeged, 2012: presentation; printable.

44. Keith A. Kearnes, Emil W. Kiss, Ágnes Szendrei, Growth rates of algebras I: pointed cube terms. Journal of the Australian Mathematical Society 101:(1) (2016), 56-94.

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45. Keith A. Kearnes, Emil W. Kiss, Ágnes Szendrei, Growth rates of algebras II: Weigold dichotomy. International Journal of Algebra and Computation 25:(4) (2015), 555-566.

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46. Keith A. Kearnes, Emil W. Kiss, Ágnes Szendrei, Growth rates of algebras III: finite solvable algebras. Algebra Universalis 76:(2) (2016), 199-222.

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    Lecture in Prague, 2014: presentation; printable.

47. Keith A. Kearnes, Emil W. Kiss, Ágnes Szendrei,  Minimal abelian varieties of algebras, I. International Journal of Algebra and Computation.  31:(2) (2021), 205-217

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For high school students

1. E. W. Kiss, How to prove that it cannot be proved (in Hungarian, “Hogy lehet, hogy nem lehet”). New Mathematical Mosaic (TypoTeX) (2002), 269-301.
2. E. W. Kiss, G. Moussong, Point sets on the plane with strong symmetry properties (in Hungarian, “Síkbeli ponthalmazok erős szimmetriatulajdonságokkal”). Középiskolai Matematikai Lapok (2004), 2-8.
3. K. A. Kearnes, E. W. Kiss, Á. Szendrei, Gaussian integers and Dirichlet’s theorem, I-II (in Hungarian, “Gauss-egészek és Dirichlet tétele”). Középiskolai Matematikai Lapok (2010).

   Download: I (pdf); II (pdf).