Ring $R_{ 213 }$

Non-ACCP power-series

Description:

$R=R_{212}[[X]]$

Keywords power series ring

Reference(s):

  • D. Frohn. A counterexample concerning ACCP in power series rings. (2002) @ Main example


Known Properties
Name
$\pi$-regular
$I_0$
?-ring
ACC annihilator
almost maximal ring
almost maximal valuation ring
analytically normal
analytically unramified
arithmetical
Armendariz
Baer
Bezout
Boolean
catenary
clean
co-Hopfian
cogenerator ring
coherent
complete local
continuous
countable
CS
DCC annihilator
directly irreducible
distributive
dual
essential socle
exchange
FGC
FI-injective
finite uniform dimension
finitely cogenerated
finitely generated socle
finitely pseudo-Frobenius
fully semiprime
Goldie
Henselian local
hereditary
Ikeda-Nakayama
J-0
J-1
J-2
Jacobson
Kasch
lift/rad
linearly compact
local
max ring
maximal ring
maximal valuation ring
nil radical
nilpotent radical
nonsingular
nonzero socle
normal
orthogonally finite
periodic
potent
principally injective
pseudo-Frobenius
quasi-continuous
rad-nil
reduced
Rickart
self-injective
semi-Artinian
semi-Noetherian
semihereditary
semilocal
semiperfect
semiprime
semiprimitive
semiregular
serial
simple socle
simple-injective
stable range 1
strongly $\pi$-regular
strongly connected
strongly regular
subdirectly irreducible
T-nilpotent radical
top regular
top simple
top simple Artinian
torch
UGP ring
uniform
uniserial ring
unit regular
universally catenary
universally Japanese
V ring
valuation ring
von Neumann regular
weakly clean
Zorn
$h$-local domain
ACC principal
algebraically closed field
almost Dedekind domain
almost maximal domain
Archimedean field
Artinian
atomic domain
Bezout domain
characteristic 0 field
Cohen-Macaulay
complete discrete valuation ring
Dedekind domain
discrete valuation ring
division ring
domain
Euclidean domain
Euclidean field
excellent
field
finite
free ideal ring
Frobenius
fully prime
GCD domain
Goldman domain
Gorenstein
Grothendieck
Krull domain
local complete intersection
Mori domain
N-1
N-2
Nagata
Noetherian
normal domain
ordered field
Ore domain
PCI ring
perfect
perfect field
primary
prime
primitive
principal ideal domain
principal ideal ring
Prufer domain
Pythagorean field
quadratically closed field
quasi-excellent
quasi-Frobenius
regular
regular local
Schreier domain
semi free ideal ring
semiprimary
semisimple
simple
simple Artinian
unique factorization domain
uniserial domain
valuation domain
2-primal
Abelian
anti-automorphic
commutative
compressible
Dedekind finite
duo
IBN
IC ring
involutive
McCoy
NI ring
Ore ring
polynomial identity
quasi-duo
reversible
semicommutative
stably finite
symmetric
Legend
  • = has the property
  • = does not have the property
  • = information not in database

(Nothing was retrieved.)

(Nothing was retrieved.)