T_E(X)的由幂等元生成的子半群

A subsemigroup generated by the idempotents of T_E(X) ZOU Ding-yu,PEI Hui-sheng,WANG Shi-fei

  • 摘要: 设X为有限集合,TX为X上的全变换半群,设E为X上任一非平凡等价关系,变换半群TE(X)定义为TE(X)=f∈TX∶ (a,b)∈E,(f(a),f(b))∈E.讨论了半群TE(X)的由幂等元生成的子半群T2,以及由亏值为1的幂等元作为生成元时,T2的极小生成元集,并且求出了这个极小生成集的元素个数.

     

    Abstract: Let X be a finite set, T_X be the full transformation semigroup on X,E an equivalence on X. The transformation semigroup T_E(X) is defined asT_E(X)=f∈T_X∶(a,b)∈E,(f(a),f(b))∈E.A subsemigroup of T_E(X),which is generated by the idempotents of T_E(X),is considered.It is shown that a mininal generating set ∪~r_(i=1)M~*_i of the idempotents with defect 1 must contain 12(∑~r_(i=1)(|A_i|)(|A_i|-1)) members.

     

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