Ring $R_{ 39 }$

Chase's left-not-right semihereditary ring

Description:

Let $S$ be von Neumann regular which has an ideal $I$ which is not a direct summand of $S_S$. Let $R$ be $S/I$. Form the triangular ring $T=\begin{bmatrix}R&R\\ 0& S\end{bmatrix}$. $T$ is the ring. For concreteness, we pick $S=\prod_{i=1}^\infty F_2$, and $I$ a maximal essential ideal.

Keywords quotient ring triangular ring

Reference(s):

T. Lam. Lectures on modules and rings. (2012) @ pp 47-48

Symmetric properties

	Name
	compressible
	Abelian
	anti-automorphic
	Armendariz
	Baer
	Boolean
	commutative
	countable
	directly irreducible
	division ring
	domain
	field
	finite
	Frobenius
	fully prime
	fully semiprime
	involutive
	local
	orthogonally finite
	periodic
	primary
	prime
	quasi-Frobenius
	reduced
	reversible
	semi free ideal ring
	semicommutative
	semilocal
	semiperfect
	semiprimary
	semiprime
	semiprimitive
	semisimple
	simple
	simple Artinian
	strongly connected
	strongly regular
	symmetric
	top simple
	top simple Artinian
	unit regular
	von Neumann regular
	$\pi$-regular
	$I_0$
	2-primal
	clean
	Dedekind finite
	exchange
	IBN
	IC ring
	lift/rad
	NI ring
	nil radical
	nilpotent radical
	polynomial identity
	potent
	semiregular
	stable range 1
	stably finite
	strongly $\pi$-regular
	top regular
	weakly clean
	Zorn

Asymmetric properties

left	Name	right
	Bezout
	cogenerator ring
	continuous
	CS
	dual
	essential socle
	FI-injective
	finitely generated socle
	finitely pseudo-Frobenius
	Ikeda-Nakayama
	Kasch
	max ring
	McCoy
	nonzero socle
	principally injective
	quasi-continuous
	quasi-duo
	semi-Artinian
	semi-Noetherian
	simple socle
	simple-injective
	self-injective
	coherent
	nonsingular
	hereditary
	ACC annihilator
	ACC principal
	Artinian
	Bezout domain
	DCC annihilator
	distributive
	duo
	finite uniform dimension
	finitely cogenerated
	free ideal ring
	Goldie
	linearly compact
	Noetherian
	Ore domain
	PCI ring
	perfect
	primitive
	principal ideal domain
	principal ideal ring
	pseudo-Frobenius
	serial
	uniform
	uniserial domain
	uniserial ring
	V ring
	Rickart
	semihereditary
	cohopfian
	Ore ring
	T-nilpotent radical
	UGP ring

Legend

= has the property
= does not have the property
= information not in database

Name	Measure
cardinality	$\mathfrak c$
composition length	left: $\infty$	right: $\infty$
Krull dimension (classical)	0

Name	Description
Left singular ideal	$\{0\}$