All pages

Next page (Regular local ring implies integral domain)

Adequate domain
Affine algebraic variety
Affine domain
Affine ring
Affine scheme
Algebraic extension
Algebraic norm in a number field
Annihilator of Noetherian module has Noetherian quotient
Applying Artin-Rees lemma
Applying Noetherianness
Artin-Rees lemma
Artin-Tate lemma
Artinian implies Cohen-Macaulay
Artinian implies IZ
Artinian ring
Associate elements
Associate implies same orbit under multiplication by group of units in integral domain
Associated prime to a module
Associated primes turns short exact sequences to sub-unions
Automorphism-invariant Euclidean norm
Automorphism-invariant norm
Automorphism group acts transitively on fibers of spectrum over fixed-point subring
Bezout domain
Bezout implies gcd
Bezout ring
Birational map of varieties
Blowup algebra
Book:Eisenbud
Cancellative ring
Cartier divisor
Catenary module
Catenary ring
Cayley-Hamilton theorem
Characteristic ideal
Characteristic of a ring
Characteristic subring
Characteristically Euclidean domain
Chinese remainder theorem
Classification of norm-Euclidean imaginary quadratic integer rings
Codimension of an ideal
Coefficient field
Cohen-Macaulay ideal
Cohen-Macaulay implies universally catenary
Cohen-Macaulay is polynomial-closed
Cohen-Macaulay ring
Cohen structure theorem
Coherent ring
Commutative unital ring
Compact space
Complete intersection
Complete local ring
Complete system of prime ideals
Completion of a ring
Conductor of a numerical semigroup
Connected scheme
Content of a polynomial
Contraction of an ideal
Convention:Commutative unital rings
Dedekind-Hasse norm
Dedekind-Hasse norm implies principal ideal ring
Dedekind domain
Dedekind not implies PID
Depth of an ideal
Determinantal ideal theorem
Determinantal ring
Dimension of an ideal
Divided polynomial ring
Dominant rational map
Effect of ideal contraction on Galois correspondent
Eisenstein's criterion
Element of minimum Dedekind-Hasse norm is a unit
Element of minimum norm among non-units in Euclidean ring is a universal side divisor
Element of minimum norm in Euclidean ring is a unit
Elementary divisor domain
Elementary divisor ring
Elements in same orbit under multiplication by group of units are associate
Equicharacteristic ring
Equidimensional catenary ring
Equidimensional ring
Equivalence of definitions of Cohen-Macaulay ring
Equivalence of dimension notions for Noetherian local ring
Equivalence of dimension notions for affine domain
Euclidean domain
Euclidean implies Dedekind-Hasse
Euclidean implies principal ideal
Euclidean norm
Euclidean not implies norm-Euclidean
Euclidean ring that is not a field has a universal side divisor
Euclideanness is localization-closed
Euclideanness is quotient-closed
Every Euclidean ring has a unique smallest Euclidean norm
Every binomial polynomial is irreducible but not prime in the ring of integer-valued polynomials over rational integers
Every element has power in subring implies bijective on spectra
Every irreducible is prime implies any two irreducible factorizations are equal upto ordering and associates
Every proper ideal is contained in a maximal ideal
Extension of an ideal
Field
Filtered ring
Filtrative Euclidean norm
Filtrative and multiplicatively monotone Euclidean implies uniquely Euclidean
Filtrative norm
Finite-dimensional Noetherian ring
Finite-dimensional algebra over a field
Finite-dimensional ring
Finite morphism
Finite morphism implies finite on spectra
Finite ring
Finitely generated and integral equals finite
Finitely generated ideal
Finitely generated module
Finitely generated morphism
Formal power series ring
Free ideal ring
Free module
Free resolution
Fully invariant ideal
Galois correspondence between a ring and its max-spectrum
Galois correspondence between a ring and its spectrum
Galois correspondence induced by a binary relation
Galois correspondence of extension and contraction
Galois group
Galois number field
Gauss's lemma
Gcd domain
Gcd not implies Bezout
Generalized local ring
Geometric condition for imaginary quadratic integer ring to be norm-Euclidean
Global dimension of a ring
Going-down subring
Going down
Going down extension
Going down for fixed-point subring under finite automorphism group
Going down for flat extensions
Going down for integral extensions of normal domains
Going up extension
Going up theorem
Graded Abelian group
Graded Nakayama's lemma
Graded module
Graded ring
Greatest common divisor
Grothendieck's generic freeness lemma
Group of units
Henselian local ring
Hereditary ring
Hilbert-Samuel polynomial
Hilbert basis theorem
Hilbert function
Hilbert polynomial
Hilbert syzygy theorem
Homogeneous element
Homogeneous ideal
Homomorphism of commutative unital rings
Ideal
Ideal-free subring
Ideal-large subring
Ideal generated by an irreducible element
Ideal generated by prime elements
Ideal generated by two prime elements in a unique factorization domain may be proper and not prime
Ideal in integral domain implies self-similar
Ideal of finite colength
Ideal with maximal radical
Ideal with prime radical
Image under leading coefficient map is Noetherian implies finitely generated
Imaginary quadratic number field
Indecomposable ideal
Induced map on spectra by a ring homomorphism
Injective module
Injective resolution
Integral closure of a subring
Integral domain
Integral domain in which any two irreducible factorizations are equal upto ordering and associates
Integral domain in which every irreducible is prime
Integral domain satisfying ACCP that is not a field has either infinitely many units or infinitely many associate classes of irreducibles
Integral extension
Integral extension implies inverse image of max-spectrum is max-spectrum
Integral extension implies surjective map on spectra
Integral morphism
Integrally closed subring
Intermediate subring condition for ideals
Interpolation domain
Intersection of maximal ideals
Intersection of prime equals radical
Invertible plus nilpotent implies invertible
Irreducible element
Irreducible element not implies prime
Irreducible element property is not determined by quotient ring
Irreducible ideal
Irreducible implies primary (Noetherian)
Irreducible implies prime (PID)
Irreducible not implies universal side divisor
Irreducible ring
Irreducible scheme
Isomorphism of varieties
Jacobson is polynomial-closed
Jacobson radical
Jacobson ring
Japanese ring
Koszul complex of a module
Koszul complex of a sequence of elements
Krull's height theorem
Krull's principal ideal theorem
Krull-Azikuzi theorem
Krull dimension
Krull intersection theorem for Jacobson radical
Krull intersection theorem for Noetherian domains
Krull intersection theorem for modules
Lagrange interpolation formula
Laurent polynomial ring
Leading coefficient map
Length of irreducible factorization is strictly multiplicatively monotone on unique factorization domain
Linearly closed subring
Local Cohen-Macaulay ring
Local Noetherian domain
Local Noetherian domain implies equidimensional
Local domain
Local ring
Localization at a prime ideal
Localization at a submonoid
Localization respects associated primes for Noetherian rings
Locally a complete intersection
Locally ringed space
Main Page
Map to localization is injective on spectra
Max-spectrum of a commutative unital ring
Max-spectrum of multivariate polynomial ring over an algebraically closed field
Max-spectrum of polynomial ring over a field
Maximal ideal
Maximal implies prime
Minimal prime ideal
Minimal resolution
Minimum over principal ideal of Euclidean norm is a smaller multiplicatively monotone Euclidean norm
Module over a commutative unital ring
Monomial ideal
Morita-equivalent modules
Morphism of varieties
Multi-stage Euclidean domain
Multi-stage Euclidean implies Bezout
Multiplicative Dedekind-Hasse norm
Multiplicative Euclidean norm
Multiplicative norm
Multiplicatively closed subset
Multiplicatively monotone Euclidean norm
Multiplicatively monotone Euclidean norm admits unique Euclidean division for exact divisor
Multiplicatively monotone norm
Multiplicatively monotone norm is constant on associate classes
Multivariate polynomial ring
Multivariate polynomial ring over a field
Nagata ring
Nakayama's lemma
Natural map from topological space to max-spectrum of ring of continuous real-valued functions is an injection iff the space is Urysohn
Nilpotent element
Nilradical
Nilradical equals intersection of all prime ideals
Nilradical is an ideal
Nilradical is smallest radical ideal
Nilradical of subring lemma
Noether normalization theorem
Noetherian
Noetherian UFD
Noetherian and Bezout iff principal ideal
Noetherian domain
Noetherian domain implies every prime ideal is generated by finitely many irreducible elements
Noetherian implies every element in minimal prime is zero divisor
Noetherian implies intersection of minimal primes is irredundant
Noetherian is polynomial-closed
Noetherian local ring
Noetherian local ring of positive dimension has element in maximal ideal outside minimal primes
Noetherian module
Noetherian normal domain
Noetherian not implies zero divisor in minimal prime
Noetherian ring
Noetherian ring has finitely many minimal primes and every prime contains a minimal prime
Noetherianness is quotient-closed
Nonnegative norm
Nonzerodivisor on a module
Norm-Euclidean number field
Norm-Euclidean ring of integers
Norm on a commutative unital ring
Normal
Normal domain
Normal ring
Normality is polynomial-closed
Normalization of a reduced ring
Number field
Number field with positive algebraic norm
Numerical semigroup
One-dimensional Noetherian domain implies Cohen-Macaulay
One-dimensional domain
One-dimensional ring
PID implies UFD
PID implies one-dimensional
PID not implies Euclidean
Perfect field
Perfect ideal
Permutation of regular sequence is not necessarily regular
Polynomial-closed property
Polynomial ring
Polynomial ring over a field
Polynomial ring over a field is uniquely Euclidean with norm equal to degree
Polynomial ring over integrally closed subring is integrally closed in polynomial ring
Power of an ideal
Primary decomposition of an ideal
Primary decomposition theorem for ideals
Primary ideal
Primary implies prime radical
Primary ring
Prime avoidance lemma
Prime element
Prime factorization of element is unique irreducible factorization upto ordering and associates
Prime ideal
Prime ideal need not contain any prime element
Primeness is contraction-closed
Principal ideal
Principal ideal domain
Principal ideal domain admits multiplicative Dedekind-Hasse norm
Principal ideal is isomorphic to integral domain as a module
Principal ideal ring
Principal ideal ring iff every prime ideal is principal
Principal ideal ring implies one-dimensional
Principal prime ideal
Product of ideals
Projective algebraic variety
Projective dimension of a module
Projective module
Projective resolution
Proper ideal
Proper integrally closed subring has infinite index
Property of commutative unital rings
Purely transcendental field extension
Quadratic number field
Quasi-Frobenius ring
Quasilocal ring
Quotient-closed property of commutative unital rings
Rabinowitch's trick
Radical ideal
Radical of an ideal
Radically closed subring
Rational map of varieties
Real quadratic number field
Reduced Noetherian implies zero divisor in minimal prime
Reduced Noetherian one-dimensional implies Cohen-Macaulay
Reduced ring
Regular function
Regular local ring

Next page (Regular local ring implies integral domain)

Retrieved from "https://commalg.subwiki.org/wiki/Special:AllPages"