The order of generalized hypersubstitutions of type τ = (2)
The order of hypersubstitutions, all idempotent elements on the monoid of all hypersubstitutions of type τ = (2) were studied by K. Denecke and Sh. L. Wismath and all idempotent elements on the monoid of all hypersubstitutions of type τ = (2, 2) were studied by Th. Changpas and K. Denecke. We want t...
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th-cmuir.6653943832-605492018-09-10T03:44:54Z The order of generalized hypersubstitutions of type τ = (2) Wattapong Puninagool Sorasak Leeratanavalee Mathematics The order of hypersubstitutions, all idempotent elements on the monoid of all hypersubstitutions of type τ = (2) were studied by K. Denecke and Sh. L. Wismath and all idempotent elements on the monoid of all hypersubstitutions of type τ = (2, 2) were studied by Th. Changpas and K. Denecke. We want to study similar problems for the monoid of all generalized hypersubstitutionsof type τ = (2). In this paper, we use similar methods to characterize idempotent generalizedhypersubstitutions of type τ = (2) and determine the order of eachgeneralized hypersubstitution of this type. The main result isthat the order is 1,2 or infinite. 2018-09-10T03:44:54Z 2018-09-10T03:44:54Z 2008-12-01 Journal 16870425 01611712 2-s2.0-61549096569 10.1155/2008/263541 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=61549096569&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/60549 |
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Mathematics |
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Mathematics Wattapong Puninagool Sorasak Leeratanavalee The order of generalized hypersubstitutions of type τ = (2) |
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The order of hypersubstitutions, all idempotent elements on the monoid of all hypersubstitutions of type τ = (2) were studied by K. Denecke and Sh. L. Wismath and all idempotent elements on the monoid of all hypersubstitutions of type τ = (2, 2) were studied by Th. Changpas and K. Denecke. We want to study similar problems for the monoid of all generalized hypersubstitutionsof type τ = (2). In this paper, we use similar methods to characterize idempotent generalizedhypersubstitutions of type τ = (2) and determine the order of eachgeneralized hypersubstitution of this type. The main result isthat the order is 1,2 or infinite. |
| format |
Journal |
| author |
Wattapong Puninagool Sorasak Leeratanavalee |
| author_facet |
Wattapong Puninagool Sorasak Leeratanavalee |
| author_sort |
Wattapong Puninagool |
| title |
The order of generalized hypersubstitutions of type τ = (2) |
| title_short |
The order of generalized hypersubstitutions of type τ = (2) |
| title_full |
The order of generalized hypersubstitutions of type τ = (2) |
| title_fullStr |
The order of generalized hypersubstitutions of type τ = (2) |
| title_full_unstemmed |
The order of generalized hypersubstitutions of type τ = (2) |
| title_sort |
order of generalized hypersubstitutions of type τ = (2) |
| publishDate |
2018 |
| url |
https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=61549096569&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/60549 |
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