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Theoretical Backgrounds of Applied Discrete Mathematics
Equations over direct powers of algebraic structures in relational languages
A. Shevlyakovab a Sobolev Institute of Mathematics SB RAS, Omsk, Russian Federation
b Omsk State Technical University, Omsk, Russian Federation
Abstract:
For a semigroup $S$ (group $G$) we study relational equations and describe all semigroups $S$ with equationally Noetherian direct powers. It follows that any group $G$ has equationally Noetherian direct powers if we consider $G$ as an algebraic structure of a certain relational language. Further we specify the results as follows: if a direct power of a finite semigroup $S$ is equationally Noetherian, then the minimal ideal $\text{Ker}(S)$ of $S$ is a rectangular band of groups and $\text{Ker}(S)$ coincides with the set of all reducible elements.
Keywords:
relations, groups, semigroups, direct powers, equationally Noetherian algebraic structures.
Citation:
A. Shevlyakov, “Equations over direct powers of algebraic structures in relational languages”, Prikl. Diskr. Mat., 2021, no. 53, 5–11
Linking options:
https://www.mathnet.ru/eng/pdm743 https://www.mathnet.ru/eng/pdm/y2021/i3/p5
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