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Primitive ideal

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Annihilator of a simple module Not to be confused with primary ideal or principal ideal.

In mathematics, specifically ring theory, a left primitive ideal is the annihilator of a (nonzero) simple left module. A right primitive ideal is defined similarly. Left and right primitive ideals are always two-sided ideals.

Primitive ideals are prime. The quotient of a ring by a left primitive ideal is a left primitive ring. For commutative rings the primitive ideals are maximal, and so commutative primitive rings are all fields.

Primitive spectrum

The primitive spectrum of a ring is a non-commutative analog of the prime spectrum of a commutative ring.

Let A be a ring and Prim ( A ) {\displaystyle \operatorname {Prim} (A)} the set of all primitive ideals of A. Then there is a topology on Prim ( A ) {\displaystyle \operatorname {Prim} (A)} , called the Jacobson topology, defined so that the closure of a subset T is the set of primitive ideals of A containing the intersection of elements of T.

Now, suppose A is an associative algebra over a field. Then, by definition, a primitive ideal is the kernel of an irreducible representation π {\displaystyle \pi } of A and thus there is a surjection

π ker π : A ^ Prim ( A ) . {\displaystyle \pi \mapsto \ker \pi :{\widehat {A}}\to \operatorname {Prim} (A).}

Example: the spectrum of a unital C*-algebra.

See also

Notes

  1. A primitive ideal tends to be more of interest than a prime ideal in non-commutative ring theory.

References

External links


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