The article considers a problem from Trokhimenko paper [13] concerning the study of abstract properties of commutations of operations and their connection with the Menger and Mann superpositions. Namely, abstract characterizations of some classes of operation algebras, whose signature consists of arbitrary families of commutations of operations, Menger and Mann superpositions and their various connections are found. Some unsolved problems are given at the end of the article.
@article{bwmeta1.element.bwnjournal-article-doi-10_7151_dmgaa_1082, author = {Fedir M. Sokhatsky}, title = {Commutation of operations and its relationship with Menger and Mann superpositions}, journal = {Discussiones Mathematicae - General Algebra and Applications}, volume = {24}, year = {2004}, pages = {153-176}, zbl = {1074.08002}, language = {en}, url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-doi-10_7151_dmgaa_1082} }
Fedir M. Sokhatsky. Commutation of operations and its relationship with Menger and Mann superpositions. Discussiones Mathematicae - General Algebra and Applications, Tome 24 (2004) pp. 153-176. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-doi-10_7151_dmgaa_1082/
[000] [1] V.D. Belousov, Conjugate operations (Russian), 'Studies in General Algebra' (Russian), Akad. Nauk Moldav. SSR Kishinev (Chishinau) 1965, 37-52.
[001] [2] V.D. Belousov, Balanced identities in quasigroups, (Russian) Mat. Sb. (N.S.) 70 (112) (1966), 55-97. | Zbl 0199.05203
[002] [3] V.D. Belousov, Systems of orthogonal operations (Russian), Mat. Sb. (N.S.) 77 (119) (1968), 38-58.
[003] [4] K. Denecke and P. Jampachon, N-solid varietes of free Menger algebras of rank n, Eastwest J. Math. 5 (2003), 81-88. | Zbl 1083.08005
[004] [5] W.A. Dudek and V.S. Trokhimenko, Functional Menger P-algebras, Comm. Algebra 30 (2003), 5921-5931. | Zbl 1018.20057
[005] [6] K. Głazek, Morphisms of general algebras without fixed fundamental operations, 'General Algebra and Applications', Heldermann-Verlag, Berlin 1993, 89-112. | Zbl 0793.08006
[006] [7] K. Głazek, Algebras of Algebraic Operations and Morphisms of Algebraic System (Polish), Wydawnictwo Uniwersytetu Wroc awskiego, Wrocaw 1994 (146 pp.).
[007] [8] A. Knoebel, Cayley-like representations are for all algebras, not morely groups, Algebra Universalis 46 (2001), 487-497. | Zbl 1058.08002
[008] [9] H. Mann, On orthogonal latin squares, Bull. Amer. Math. Soc. 50 (1944), 249-257. | Zbl 0060.32307
[009] [10] K. Menger, The algebra of functions: past, present and future, Rend. Mat. Appl. 20 (1961), 409-430. | Zbl 0113.03904
[010] [11] M.B. Schein and V.S. Trohimenko, Algebras of multiplace functions, Smigroup Forum 17 (1979), 1-64. | Zbl 0397.08001
[011] [12] F.N. Sokhatsky, An abstract characterization (2,n)-semigroups of n-ary operations (Russian), Mat. Issled. no. 65 (1982), 132-139.
[012] [13] V.S. Trokhimenko, On algebras of binary operations (Russian), Mat. Issled. no. 24 (1972), 253-261.
[013] [14] T. Yakubov, About (2,n)-semigroups of n-ary operations (Russian), Izvest. Akad. Nauk Moldav. SSR (Bul. Akad. Stiince RSS Moldaven) 1974, no. 1, 29-46.
[014] [15] K.A. Zaretski, An abstract characterization of the bisemigroup of binaryoperations (Russian), Mat. Zametki 1 (1965), 525-530.