A REPRESENTATION THEOREM FOR MEASURABLE RELATION ALGEBRAS WITH CYCLIC GROUPS

A relation algebra is measurable if the identity element is a sum of atoms, and the square x; 1; x of each subidentity atom x is a sum of non-zero functional elements. These functional elements form a group Gam. We prove that a measurable relation algebra in which the groups Gx are all finite and cyclic is completely representable. A structural description of these algebras is also given.