Associated prime explained

In abstract algebra, an associated prime of a module M over a ring R is a type of prime ideal of R that arises as an annihilator of a (prime) submodule of M. The set of associated primes is usually denoted by

\operatorname{Ass}R(M),

and sometimes called the assassin or assassinator of (word play between the notation and the fact that an associated prime is an annihilator).[1]

In commutative algebra, associated primes are linked to the Lasker–Noether primary decomposition of ideals in commutative Noetherian rings. Specifically, if an ideal J is decomposed as a finite intersection of primary ideals, the radicals of these primary ideals are prime ideals, and this set of prime ideals coincides with

\operatorname{Ass}R(R/J).

Also linked with the concept of "associated primes" of the ideal are the notions of isolated primes and embedded primes.

Definitions

A nonzero R-module N is called a prime module if the annihilator

AnnR(N)=AnnR(N')

for any nonzero submodule N' of N. For a prime module N,

AnnR(N)

is a prime ideal in R.

An associated prime of an R-module M is an ideal of the form

AnnR(N)

where N is a prime submodule of M. In commutative algebra the usual definition is different, but equivalent: if R is commutative, an associated prime P of M is a prime ideal of the form

AnnR(m)

for a nonzero element m of M or equivalently

R/P

is isomorphic to a submodule of M.

In a commutative ring R, minimal elements in

\operatorname{Ass}R(M)

(with respect to the set-theoretic inclusion) are called isolated primes while the rest of the associated primes (i.e., those properly containing associated primes) are called embedded primes.

A module is called coprimary if xm = 0 for some nonzero m ∈ M implies xnM = 0 for some positive integer n. A nonzero finitely generated module M over a commutative Noetherian ring is coprimary if and only if it has exactly one associated prime. A submodule N of M is called P-primary if

M/N

is coprimary with P. An ideal I is a P-primary ideal if and only if

\operatorname{Ass}R(R/I)=\{P\}

; thus, the notion is a generalization of a primary ideal.

Properties

Most of these properties and assertions are given in starting on page 86.

AssR(M')\subseteqAssR(M).

If in addition M' is an essential submodule of M, their associated primes coincide.

Spec(R).

If R is an Artinian ring, then this map becomes a bijection.

E(R/ak{p})

where

E(-)

denotes the injective hull and

ak{p}

ranges over the prime ideals of R.

For the case for commutative Noetherian rings, see also Primary decomposition#Primary decomposition from associated primes.

Examples

R=C[x,y,z,w]

the associated prime ideals of

I=((x2+y2+z2+w2)(z3-w3-3x3))

are the ideals

(x2+y2+z2+w2)

and

(z3-w3-3x3).

References

Notes and References

  1. Picavet . Gabriel. Propriétés et applications de la notion de contenu. Communications in Algebra. 1985 . 13. 10. 2231–2265. 10.1080/00927878508823275.