Abstract
In [7] and [8], it is established that given any abstract countable structure S and a relation R on S, then as long as S has a recursive copy satisfying extra decidability conditions, R will be ∑0α on every recursive copy of S iff R is definable in S by a special type of infinitary formula, a ∑rα() formula. We generalize the typ e of constructions of these papers to produce conditions under which, given two disjoint relations R1 and R2 on S, there is a recursive copy of S in which R1 and R2 are 0α inseparable. We then apply these theorems to specific everyday structures such as linear orderings, boolean algebras andvector spaces