jacobson ring造句
例句與造句
- The Witt ring is a Jacobson ring.
- Thus, the lemma follows from the fact that a field is a Jacobson ring.
- Let R be a Jacobson ring.
- If S is a finitely generated " R "-algebra, then S is a Jacobson ring.
- In particular a morphism of finite type of Jacobson rings induces a morphism of the maximal spectrums of the rings.
- It's difficult to find jacobson ring in a sentence. 用jacobson ring造句挺難的
- In fact, a commutative ring is a Jacobson ring if and only if every Goldman ideal in it is maximal.
- The Nullstellensatz will also follow trivially once one systematically developed the theory of a Jacobson ring, a ring in which a radical ideal is an intersection of maximal ideals.
- G-ideals are the only maximal ideals in Jacobson ring, and in fact this is an equivalent characterization of a Jacobson ring : a ring is a Jacobson ring when all maximal ideals are G-ideals.
- G-ideals are the only maximal ideals in Jacobson ring, and in fact this is an equivalent characterization of a Jacobson ring : a ring is a Jacobson ring when all maximal ideals are G-ideals.
- G-ideals are the only maximal ideals in Jacobson ring, and in fact this is an equivalent characterization of a Jacobson ring : a ring is a Jacobson ring when all maximal ideals are G-ideals.
- In general, a ring " R " is a Jacobson ring if and only if every finitely generated " R "-algebra that is a field is finite over " R ".
- Jacobson rings were introduced independently by, who named them after Nathan Jacobson because of their relation to Jacobson radicals, and by, who named them Hilbert rings after David Hilbert because of their relation to Hilbert's Nullstellensatz.