Classification of generalized ternary quadratic quasigroup functional equations of the length three

Authors

  • F.M. Sokhatsky Vasyl’ Stus Donetsk National University, 21 600-richya str., 21021, Vinnytsia, Ukraine
  • A.V. Tarasevych Khmelnytskyi National University, 11 Instytytska str., 29016, Khmelnytskyi, Ukraine
https://doi.org/10.15330/cmp.11.1.179-192

Keywords:

ternary quasigroup, quadratic equation, length of a functional equation, parastrophically primary equivalence
Published online: 2019-06-30

Abstract

A functional equation is called: generalized if all functional variables are pairwise different; ternary if all its functional variables are ternary; quadratic if each individual variable has exactly two appearances; quasigroup if its solutions are studied only on invertible functions. A length of a functional equation is the number of all its functional variables.  A complete classification up to parastrophically primary equivalence of generalized quadratic quasigroup functional equations of the length three is given. Solution sets of a full family of representatives of the equivalence are found.

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How to Cite
(1)
Sokhatsky, F.; Tarasevych, A. Classification of Generalized Ternary Quadratic Quasigroup Functional Equations of the Length Three. Carpathian Math. Publ. 2019, 11, 179-192.