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ЖУРНАЛЫ // Algebra and Discrete Mathematics // Архив

Algebra Discrete Math., 2004, выпуск 4, страницы 1–11 (Mi adm356)

Эта публикация цитируется в 5 статьях

RESEARCH ARTICLE

Clones of full terms

Klaus Deneckea, Prakit Jampachonb

a University of Potsdam, Institute of Mathematics, Am Neuen Palais, 14415 Potsdam, Germany
b KhonKaen University, Department of Mathematics, KhonKaen,  40002 Thailand

Аннотация: In this paper the well-known connection between hyperidentities of an algebra and identities satisfied by the clone of this algebra is studied in a restricted setting, that of $n$-ary full hyperidentities and identities of the $n$-ary clone of term operations which are induced by full terms. We prove that the $n$-ary full terms form an algebraic structure which is called a Menger algebra of rank $n$. For a variety $V$, the set $Id_n^FV$ of all its identities built up by full $n$-ary terms forms a congruence relation on that Menger algebra. If $Id_n^FV$ is closed under all full hypersubstitutions, then the variety $V$ is called $n-F$-solid. We will give a characterization of such varieties and apply the results to $2-F$-solid varieties of commutative groupoids.

Ключевые слова: Clone, unitary Menger algebra of type $\tau_n$, full hyperidentity, $n-F$-solid variety.

MSC: 08A40, 08A60, 08A02, 20M35

Поступила в редакцию: 23.02.2004
Исправленный вариант: 17.12.2004

Язык публикации: английский



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