Naturally ordered groupoid

A partially ordered groupoid (cf. Partially ordered set; Groupoid) $H$ in which all elements are positive (that is, $a\leq ab$ and $b\leq ab$ for any $a,b\in H$) and the larger of two elements is always divisible (on both the left and the right) by the smaller, that is, $a<b$ implies that $ax=ya=b$ for some $x,y\in H$. The positive cone of any partially ordered group (cf. Ordered group) is a naturally ordered semi-group.

• ^[1] L. Fuchs, "Partially ordered algebraic systems", Pergamon (1963) Template:ZBL

0.00 (0 votes) From The Encyclopedia of Math: Naturally ordered groupoid.