Fractional ideals

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last update: 25 June 2012

Fractional ideals

Let $A$ be a commutative ring. Let $P$ be a finitely generated projective $A -$ module. Let $p \in Spec (A) .$

The rank of $P$ at $p$ , ${rk}_{p} (P)$ is the rank of the free $A_{p} -$ module $P_{p} .$
The rank of $P$ is $n$ if ${rk}_{p} (P) = n$ for all $p \in Spec (A) .$

The set $P (A) = {\binom{isomorphism classes cl (P) of}{\binom{finitely generated projective A -modules}{P of rank 1}}}$ with operation $cl (M) + cl (N) = cl (M \otimes_{A} N)$ is an abelian group.

Let $A$ be a commutative ring, $S$ a multiplicatively closed subset such that if $s \in S$ then $s$ is not a zero divisor in $A,$ $B = S^{- 1} A .$

An invertible sub $A -$ module is a sub $A -$ module $M$ of $B$ such that there exists a sub $A -$ module $N$ of $B$ such that $M \cdot N = A .$

Let $𝒥 = {invertible A -submodules of B}$ with product multiplication. Then there is an exact sequence of abelian groups $\begin{array}{c} {1} & \to & A^{\times} & \to & B^{\times} & \overset{θ}{\to} & 𝒥 & \overset{cl}{\to} & P (A) & \overset{φ}{\to} & P (B) \\ a & \mapsto & a \\ b & \mapsto & A b \\ M & \mapsto & cl (M) & \mapsto & cl (B \otimes_{A} M) . \end{array}$

If $A$ is an integral domain, $S = A - {0}$ and $B$ is the field of fractions of $A$ then $𝒥 \overset{cl}{\to} P (A) is an isomorphism.$

An invertible fractional ideal is an element of $𝒥 .$
A principal fractional ideal is an element of $im θ .$

Notes and References

The Theorem is given in [Bou, Comm. Ch.II, §5 no.4, Proposition 7] and the definitions and proofs of well-definedness of rank of $P$ are given in [Bou, Comm. Ch.II, §5 no.3].

References

References?

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