A. N. Shevlyakov, “Combining solutions for systems equations in semigroups with finite ideal”, Algebra Logika, 55:1 (2016), 87–105; Algebra and Logic, 55:1 (2016), 58

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Algebra i logika, 2016, Volume 55, Number 1, Pages 87–105
DOI: https://doi.org/10.17377/alglog.2016.55.106 (Mi al731)

This article is cited in 4 scientific papers (total in 4 papers)

Combining solutions for systems equations in semigroups with finite ideal

A. N. Shevlyakov^ab

^a Omsk State Technical University, pr. Mira 11, Omsk, 644050 Russia
^b Omsk Branch of Sobolev Institute of Mathematics, Siberian Branch, Russian Academy of Sciences, ul. Pevtsova 13, Omsk, 644099 Russia

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DOI: https://doi.org/10.17377/alglog.2016.55.106

Abstract: A semigroup $S$ is called an equational domain if any finite union of algebraic sets over $S$ is again an algebraic set. We find necessary and sufficient conditions for a semigroup with a finite minimal two-sided ideal (in particular, a finite semigroup) to be an equational domain.

Keywords: semigroups, equational domains, systems of equations.

Funding agency	Grant number
Russian Science Foundation	14-11-00085
Russian Foundation for Basic Research	14-01-00068
The work is supported by Russian Science Foundation, project 14-11-00085 (Section 5), and by RFBR, project No. 14-01-00068 (Sections 3 and 4).

Received: 27.03.2015
Revised: 10.07.2015

English version:
Algebra and Logic, 2016, Volume 55, Issue 1, Pages 58–71
DOI: https://doi.org/10.1007/s10469-016-9376-7

Bibliographic databases:

Document Type: Article

UDC: 512.53

Language: Russian

Citation: A. N. Shevlyakov, “Combining solutions for systems equations in semigroups with finite ideal”, Algebra Logika, 55:1 (2016), 87–105; Algebra and Logic, 55:1 (2016), 58–71

Citation in format AMSBIB

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https://www.mathnet.ru/eng/al/v55/i1/p87

This publication is cited in the following 4 articles:

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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Full-text PDF :	57
References:	40
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