On relative ranks of finite transformation semigroups with restricted range

UDC 512.5 We determine the relative rank of the semigroup ${\scr T }(X,Y)$ of all transformations on a finite chain $X$ with restricted range $Y\subseteq X$ modulo the set ${\scr OP }(X,Y)$ of all orientation-preserving transformations in ${\scr T }(X,Y).$ Moreover, we state the relative rank of the...

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Bibliographic Details
Date:2021
Main Authors: Dimitrova, I., Koppitz, J., I.
Format: Article
Language:English
Published: Institute of Mathematics, NAS of Ukraine 2021
Online Access:https://umj.imath.kiev.ua/index.php/umj/article/view/288
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Journal Title:Ukrains’kyi Matematychnyi Zhurnal
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Ukrains’kyi Matematychnyi Zhurnal
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Summary:UDC 512.5 We determine the relative rank of the semigroup ${\scr T }(X,Y)$ of all transformations on a finite chain $X$ with restricted range $Y\subseteq X$ modulo the set ${\scr OP }(X,Y)$ of all orientation-preserving transformations in ${\scr T }(X,Y).$ Moreover, we state the relative rank of the semigroup ${\scr OP }(X,Y)$ modulo the set ${\scr O}(X,Y)$ of all order-preserving transformations in ${\scr OP}(X,Y).$ In both cases we characterize the minimal relative generating sets.  
DOI:10.37863/umzh.v73i5.288