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2. Jacobson ring - Wikipedia

   en.wikipedia.org/wiki/Jacobson_ring

   Any finitely generated algebra over a Jacobson ring is a Jacobson ring. In particular, any finitely generated algebra over a field or the integers, such as the coordinate ring of any affine algebraic set, is a Jacobson ring. A local ring has exactly one maximal ideal, so it is a Jacobson ring exactly when that maximal ideal is the only prime ideal.

3. Jacobson radical - Wikipedia

   en.wikipedia.org/wiki/Jacobson_radical

   For a general ring with unity R, the Jacobson radical J(R) is defined as the ideal of all elements r ∈ R such that rM = 0 whenever M is a simple R-module.That is, = {=}. This is equivalent to the definition in the commutative case for a commutative ring R because the simple modules over a commutative ring are of the form R / for some maximal ideal of R, and the annihilators of R / in R are ...

4. Ring theory - Wikipedia

   en.wikipedia.org/wiki/Ring_theory

   The concept of the Jacobson radical of a ring; that is, the intersection of all right (left) annihilators of simple right (left) modules over a ring, is one example. The fact that the Jacobson radical can be viewed as the intersection of all maximal right (left) ideals in the ring, shows how the internal structure of the ring is reflected by ...

5. Jacobson density theorem - Wikipedia

   en.wikipedia.org/wiki/Jacobson_density_theorem

   In mathematics, more specifically non-commutative ring theory, modern algebra, and module theory, the Jacobson density theorem is a theorem concerning simple modules over a ring R. [ 1 ] The theorem can be applied to show that any primitive ring can be viewed as a "dense" subring of the ring of linear transformations of a vector space.

6. Hilbert's Nullstellensatz - Wikipedia

   en.wikipedia.org/wiki/Hilbert's_Nullstellensatz

   Given Zariski's lemma, proving the Nullstellensatz amounts to showing that if k is a field, then every finitely generated k-algebra R (necessarily of the form = [,,] /) is Jacobson. More generally, one has the following theorem: Let be a Jacobson ring.

7. Zariski's lemma - Wikipedia

   en.wikipedia.org/wiki/Zariski's_lemma

   The following characterization of a Jacobson ring contains Zariski's lemma as a special case. Recall that a ring is a Jacobson ring if every prime ideal is an intersection of maximal ideals. (When A is a field, A is a Jacobson ring and the theorem below is precisely Zariski's lemma.)

8. Nakayama's lemma - Wikipedia

   en.wikipedia.org/wiki/Nakayama's_lemma

   The resulting theorem is sometimes known as the Jacobson–Azumaya theorem. [13] Let J(R) be the Jacobson radical of R. If U is a right module over a ring, R, and I is a right ideal in R, then define U·I to be the set of all (finite) sums of elements of the form u·i, where · is simply the action of R on U. Necessarily, U·I is a submodule of U.

9. Jacobson's conjecture - Wikipedia

   en.wikipedia.org/wiki/Jacobson's_conjecture

   In abstract algebra, Jacobson's conjecture is an open problem in ring theory concerning the intersection of powers of the Jacobson radical of a Noetherian ring.. It has only been proven for special types of Noetherian rings, so far.