New posts in noetherian

Looking for a special class of ideals such that If every ascending chain of ideals from this class stabilizes, then $R$ is a Noetherian ring.

algebraic-geometry ring-theory commutative-algebra ideals noetherian

Grade of a maximal prime ideal in a Noetherian UFD

commutative-algebra noetherian unique-factorization-domains

Left noetherian ring but not right noetherian ring

abstract-algebra noetherian

A Noetherian integral domain is a UFD iff $(f):(g)$ is principal

abstract-algebra ring-theory noetherian unique-factorization-domains

Is this ring Noetherian?

commutative-algebra ring-theory noetherian

If $A/I \cong A/J$ as rings and $I\subseteq J,$ then $I=J.$ [duplicate]

abstract-algebra ring-theory ideals noetherian

Noetherian rings and prime ideals

commutative-algebra noetherian

$K[X^2,X^3]\subset K[X]$ is a Noetherian domain and all its prime ideals are maximal

abstract-algebra algebraic-geometry commutative-algebra noetherian krull-dimension

A ring that is left Noetherian but not right noetherian

ring-theory modules noetherian

A noetherian topological space is compact

general-topology noetherian

Is every commutative ring a limit of noetherian rings?

commutative-algebra category-theory noetherian limits-colimits

Noetherian ring with finitely many height $n$ primes

commutative-algebra noetherian krull-dimension

Is an epimorphic endomorphism of a noetherian commutative ring necessarily an isomorphism?

commutative-algebra category-theory noetherian epimorphisms

How does one prove that the ring of integer-valued polynomials $\text{Int}(\mathbb{Z})$ is not Noetherian?

commutative-algebra noetherian integer-valued-polynomials

In a noetherian integral domain every non invertible element is a product of irreducible elements

abstract-algebra commutative-algebra ring-theory integral-domain noetherian

Global dimension of quasi Frobenius ring

abstract-algebra ring-theory homological-algebra noetherian

Ring of formal power series over a principal ideal domain is a unique factorisation domain

abstract-algebra ring-theory principal-ideal-domains noetherian unique-factorization-domains

Ring is Noetherian if it admits a faithful finitely generated module with ACC on submodules generated by ideals

abstract-algebra commutative-algebra modules noetherian finitely-generated

How to prove Ass$(R/Q)=\{P\}$ if and only if $Q$ is $P$-primary when $R$ is Noetherian? [duplicate]

commutative-algebra ideals noetherian

Non-finitely generated R-module

abstract-algebra ring-theory modules noetherian projective-module