In algebra, the theorem of transition is said to hold between commutative rings if [1] [2]
Given commutative rings such that dominates and for each maximal ideal of such that is finite, the natural inclusion is a faithfully flat ring homomorphism if and only if the theorem of transition holds between . [2]
In algebra, the theorem of transition is said to hold between commutative rings if [1] [2]
Given commutative rings such that dominates and for each maximal ideal of such that is finite, the natural inclusion is a faithfully flat ring homomorphism if and only if the theorem of transition holds between . [2]