Theorem of transition

In algebra, the theorem of transition is said to hold between commutative rings $A\subset B$ if^[1]^[2]

$B$ dominates $A$ ; i.e., for each proper ideal I of A, $IB$ is proper and for each maximal ideal ${\mathfrak {n}}$ of B, ${\mathfrak {n}}\cap A$ is maximal
for each maximal ideal ${\mathfrak {m}}$ and ${\mathfrak {m}}$ -primary ideal $Q$ of $A$ , $\operatorname {length} _{B}(B/QB)$ is finite and moreover
$\operatorname {length} _{B}(B/QB)=\operatorname {length} _{B}(B/{\mathfrak {m}}B)\operatorname {length} _{A}(A/Q).$

Given commutative rings $A\subset B$ such that $B$ dominates $A$ and for each maximal ideal ${\mathfrak {m}}$ of $A$ such that $\operatorname {length} _{B}(B/{\mathfrak {m}}B)$ is finite, the natural inclusion $A\to B$ is a faithfully flat ring homomorphism if and only if the theorem of transition holds between $A\subset B$ .^[2]

References[]

^ Nagata, Ch. II, § 19.
^ Jump up to: ^a ^b Matsumura, Ch. 8, Exercise 22.1.

Nagata, Local Rings
Matsumura, Hideyuki (1986). Commutative ring theory. Cambridge Studies in Advanced Mathematics. 8. Cambridge University Press. ISBN 0-521-36764-6. MR 0879273. Zbl 0603.13001.

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[1] Nagata, Ch. II, § 19.

[Matsumura-2] Jump up to: ^a ^b Matsumura, Ch. 8, Exercise 22.1.

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