Nilpotent ideal

A one- or two-sided ideal in a ring or semi-group with zero such that for some natural number , that is, the product of any elements of vanishes. For example, in the residue class ring modulo , where is a prime number, every ideal except the ring itself is nilpotent. In the group ring of a finite -group over the field with elements the ideal generated by the elements of the form , , is nilpotent. In the ring of upper-triangular matrices over a field the matrices with 0's along the main diagonal form a nilpotent ideal.

Every element of a nilpotent ideal is nilpotent. Every nilpotent ideal is also a nil ideal and is contained in the Jacobson radical of the ring. In Artinian rings the Jacobson radical is nilpotent, and the concepts of a nilpotent ideal and a nil ideal coincide. The latter property also holds in a Noetherian ring. In a left (or right) Noetherian ring every left (right) nil ideal is nilpotent.

All nilpotent ideals of a commutative ring are contained in the nil radical, which, in general, need not be a nilpotent but only a nil ideal. A simple example of this situation is the direct sum of the rings for all natural numbers . In a commutative ring every nilpotent element is contained in some nilpotent ideal, for example, in the principal ideal generated by . In a non-commutative ring there may by nilpotent elements that are not contained in any nilpotent ideal (nor even in a nil ideal). For example, in the general matrix ring over a field there are nilpotent elements; in particular, the nilpotent matrices mentioned above, in which the only non-zero elements stand above the main diagonal, but since the ring is simple, it has no non-zero nilpotent ideals.

In a finite-dimensional Lie algebra there is maximal nilpotent ideal, which consists of the elements for which the endomorphism for is nilpotent.

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