保持一个等价关系的部分一一变换半群的Green关系

Green's Relations on the Semigroup of One-One Partial Transfomations which Preserve an Equivalence

摘要: 设X为任意非空集,E是X上的等价关系,P_X表示集合X上的部分变换半群. I_X=α∈P_X:(x,y)∈dom α,xα=yα⇒x=y,且I_X做成P_X的一个子半群, 称为对称逆半群. 定义I_E(X)=α∈I_X:x,y∈dom α,(x,y)∈E⇒(xα,yα)∈E.显然I_E(X)关于部分变换的乘积(作为半群运算)生成一个半群, 称为保持等价关系E的部分一一变换半群, 它是I_X的一个子半群. 本文对I_E(X)上的Green关系给出了完整的刻画.

Abstract: Let X be an arbitrary nonempty set and E an equivalence relation on X. Let P_X denote the partial transformation semigroup on the set X. Recall that I_X=α∈P_X:(x,y)∈dom α,xα=yα⇒x=y.Then I_X is a subsemigroup of P_X called the symmetric inverse semigroup on X. Let I_E(X)=α∈I_X:x,y∈dom α,(x,y)∈E⇒(xα,yα)∈E.Then I_E(X) is a subsemigroup of I_X. The complete discriptions for Green's relations on the semigroup I_E(X) were given.