Monographs:
[1] V. Novák, I. Perfilieva, J. Močkoř, Matematiceskije principy necetkoj logiki. Fizmatlit Nauka, Moskva, 2006.
[2] V. Novák, I. Perfilieva, J. Močkoř, Mathematical Principles of Fuzzy Logic. Kluwer Academic publishers, Boston/Dordrecht{London, 1999.
Scientific journals:
[1] J. Močkoř, alpha-Cuts and models of fuzzy logic. INT J GEN SYST 41 (2013) 67-78.
[2] J. Močkoř, Compatible elements in partly ordered groups. International Journal of Mathematics and Mathematical Sciences 24 (2005) 4041-4048.
[3] J. Močkoř, Complete subobjects of fuzzy sets over MV-algebras. CZECH MATH J 54 (2004) 379-392.
[4] J. Močkoř, Completions of cut systems in $$backslash$Omega$-sets (zasláno). Soft Computing (2012).
[5] J. Močkoř, Construction of fuzzy logic models in categories of sets with similarities. INT J GEN SYST 39 (2010) 217-233.
[6] J. Močkoř, Construction of po-groups with quasi-divisor theory. Czechoslovak Mathematical Journal 125 (2000) 197-207.
[7] J. Močkoř, Covariant functors in categories of fuzzy sets over MV-algebras. Advances in Fuzzy Sets and Systems 1 (2006) 83-109.
[8] J. Močkoř, Cut systems in sets with similarity relations. FUZZY SET SYST (2010) 3127-3140.
[9] J. Močkoř, Divisor class group and theory of quasi-divisors. PUBL MATH-DEBRECEN (2000) 507-521.
[10] J. Močkoř, Extensional subobjects in categories of Omega-fuzzy sets. Czechoslovak Mathematical Journal 57 (2007) 631-645.
[11] J. Močkoř, Fuzzy and non-deterministic automata. SOFT COMPUT (1999) 221-226.
[12] J. Močkoř, Fuzzy logic models in a category of fuzzy relations. SOFT COMPUT 13 (2009) 591-596.
[13] J. Močkoř, Fuzzy sets and cut systems in a category of sets with similarity relations. SOFT COMPUT 16 (2012) 101-107.
[14] J. Močkoř, Isomorphisms of fuzzy sets and cut systems (bude zaslán). (2012).
[15] J. Močkoř, Models of fuzzy logic in a category of sets with similarity relations. International journal of innovative computing, Information and control (2008) 1063-1068.
[16] J. Močkoř, Ordered Groups with greatest common divisor theory. International Journal of Mathematics and Mathematical Sciences 24 (2000) 469-479.
[17] J. Močkoř, Semigroup homomorphisms and fuzzy automata. SOFT COMPUT (2002) 422-427.
[18] J. Močkoř, Topological characterization of ordered groups with quasi-divisor theory. CZECH MATH J 3 (2002) 595-607.
[19] J. Močkoř, t-valuations and the theory of quasi-divisors. J PURE APPL ALGEBRA 1 (1997) 51-65.
[20] J. Močkoř, A. Kontolatou, Some remarks on Lorenzen r-group of partly ordered groups. CZECH MATH J 46 (1996) 537-552.
[21] J. Močkoř, A. Kontolatou, A. Kalapodi, Some properties of Lorenzen ideal systems. Archivum Mathematicum (2000) 289-295.
[22] J. Močkoř, R. Smolíková, Output functions of fuzzy automata. Acta Mathematica et Informatica (1998) 47-56.
Conference proceedings:
[1] J. Močkoř, alpha-Cuts and Models of Fuzzy Logic. In: Proc. The 9th International FLINS Conference on Foundations and, Singapore, 2010, pp. 52-57.
[2] J. Močkoř, Binary operations in fuzzy sets and cut systems. In: Proc. 15th Czech-Japan Seminar on Decision Making and Data Analysis under Uncertainty, Osaka, 2012, pp..
[3] J. Močkoř, Categories and fuzzy automata. In: Proc. 3th Czech-Japan Seminar on Data Analysis and Decision making under uncertainty, Osaka, 2000, pp. 154-159.
[4] J. Močkoř, Cut Systems in Omega-sets and Reflections. In: Proc. 10th International FLINS Conference, New Jersey-London-Singapore-Beijing, 2012, pp. 586-591.
[5] J. Močkoř, Extension principle for category of fuzzy sets over MV-algebras. In: Proc. Czech-Japan Seminar on Data Analysis and Decision Making under Uncertainty, Koyasaqn, 2002, pp. 160-166.
[6] J. Močkoř, Extensional objects and complete sets in categories of fuzzy sets over MV-algebras. In: Proc. 8th Czech-Japan Seminar on Data Analysis and Decision Making under Uncertainty, Praha, 2005, pp. 76-81.
[7] J. Močkoř, Fuzzy logic models in a category of sets with similarities. In: Proc. of the 8th International FLINS Conference, Singapore, 2008, pp. 163-168.
[8] J. Močkoř, Fuzzy Sets in Categories of Sets with Similarity Relations. In: Proc. Fuzzy Days, Heidelberg, 2006, pp. 677-682.
[9] J. Močkoř, Homomorphisms of fuzzy logic models based on sets with similarities. In: Proc. 5th EUSFLAT Conference, Ostrava, 2007, pp. 417-422.
[10] J. Močkoř, Characteristic morphisms and models of fuzzy logic in a category of sets with similarities. In: Proc. IFSA World Congress, Berlin, 2007, pp. 832-840.
[11] J. Močkoř, Morphisms in categories of sets with similarity relations. In: Proc. IFSA World Congress/EUSFLAT Conference, Lisabon, 2009, pp. 560-568.
