For commutative ring with identity we know that in general localization dose not commute with arbitrary intersection of ideals. I am looking for a paper that consider equivalent condition for rings with mentioned property. (I have seen such an articl but I cannot find it right now.)

For a commutative ring with identity we know that in general localization does not commute with arbitrary intersection of ideals. I am looking for a paper that considers equivalent condition(s) for rings that do have this property. (I have seen such an article but I cannot find it right now.)