Idempotent elements of WP G(2, 2) ∪ {σ id}

A generalized hypersubstitution of type τ = (2; 2) is a mapping σ which maps the binary operation symbols f and g to terms σ(f) and σ(g) which does not necessarily preserve arities. Any generalized hypersubstitution σ can be extended to a mapping σ on the set of all terms of type τ = (2; 2). A binar...

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Main Author:	Leeratanavalee S.
Format:	Article
Language:	English
Published:	2014
Online Access:	http://www.scopus.com/inward/record.url?eid=2-s2.0-84856050289&partnerID=40&md5=c83c9550a4d44cdb6d79e55f3516cca5 http://cmuir.cmu.ac.th/handle/6653943832/6411
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Institution:	Chiang Mai University
Language:	English

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spelling	th-cmuir.6653943832-64112014-08-30T03:24:11Z Idempotent elements of WP G(2, 2) ∪ {σ id} Leeratanavalee S. A generalized hypersubstitution of type τ = (2; 2) is a mapping σ which maps the binary operation symbols f and g to terms σ(f) and σ(g) which does not necessarily preserve arities. Any generalized hypersubstitution σ can be extended to a mapping σ on the set of all terms of type τ = (2; 2). A binary operation on H ypG(2; 2) the set of all generalized hypersubstitutions of type τ = (2; 2) can be defined by using this extension. The set HypG(2; 2) together with the identity hypersubstitution σ id which maps f to f(x 1; x 2) and maps g to g(x 1; x 2) forms a monoid. The concept of an idempotent element plays an important role in many branches of mathematics, for instance, in semigroup theory and semiring theory. In this paper we characterize the idempotent generalized hypersubstitutions of WP G(2, 2) ∪ {σ id} a submonoid of H ypG(2, 2). 2014-08-30T03:24:11Z 2014-08-30T03:24:11Z 2011 Article 14505444 http://www.scopus.com/inward/record.url?eid=2-s2.0-84856050289&partnerID=40&md5=c83c9550a4d44cdb6d79e55f3516cca5 http://cmuir.cmu.ac.th/handle/6653943832/6411 English
institution	Chiang Mai University
building	Chiang Mai University Library
country	Thailand
collection	CMU Intellectual Repository
language	English
description	A generalized hypersubstitution of type τ = (2; 2) is a mapping σ which maps the binary operation symbols f and g to terms σ(f) and σ(g) which does not necessarily preserve arities. Any generalized hypersubstitution σ can be extended to a mapping σ on the set of all terms of type τ = (2; 2). A binary operation on H ypG(2; 2) the set of all generalized hypersubstitutions of type τ = (2; 2) can be defined by using this extension. The set HypG(2; 2) together with the identity hypersubstitution σ id which maps f to f(x 1; x 2) and maps g to g(x 1; x 2) forms a monoid. The concept of an idempotent element plays an important role in many branches of mathematics, for instance, in semigroup theory and semiring theory. In this paper we characterize the idempotent generalized hypersubstitutions of WP G(2, 2) ∪ {σ id} a submonoid of H ypG(2, 2).
format	Article
author	Leeratanavalee S.
spellingShingle	Leeratanavalee S. Idempotent elements of WP G(2, 2) ∪ {σ id}
author_facet	Leeratanavalee S.
author_sort	Leeratanavalee S.
title	Idempotent elements of WP G(2, 2) ∪ {σ id}
title_short	Idempotent elements of WP G(2, 2) ∪ {σ id}
title_full	Idempotent elements of WP G(2, 2) ∪ {σ id}
title_fullStr	Idempotent elements of WP G(2, 2) ∪ {σ id}
title_full_unstemmed	Idempotent elements of WP G(2, 2) ∪ {σ id}
title_sort	idempotent elements of wp g(2, 2) ∪ {σ id}
publishDate	2014
url	http://www.scopus.com/inward/record.url?eid=2-s2.0-84856050289&partnerID=40&md5=c83c9550a4d44cdb6d79e55f3516cca5 http://cmuir.cmu.ac.th/handle/6653943832/6411
_version_	1681420608681803776

Idempotent elements of WP G(2, 2) ∪ {σ id}

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