Do you know of any indecomposable ring that has no isolated elements and is neither reversible, nor integral, nor nilpotent, nor unitary?

Question

Let $R$ be a non commutative ring. We will say that an element of $R$ is isolated if it is zero divisor and nothing nonzero annihilates it at the same time on both sides.

Note that there are many classes of rings that do not contain isolated elements.

$\bullet$ If $R$ is an integral ring, it does not contain isolated elements.

$\bullet$ If $R$ is a nilpotent ring, it does not contain isolated elements.

$\bullet$ If $R$ is a reversible ring, it does not contain isolated elements.

$\bullet$ If $R$ is a finite unital ring, it does not contain isolated elements.

Do you know of any indecomposable ring that has no isolated elements and is neither reversible, nor integral, nor nilpotent, nor finite unital?

Answer 1

Let $F$ be a field, and let $$ R:=F\langle x,y\, :\, x^2=xy=y^2=0\rangle. $$ Notice that $\{1,x,y,yx\}$ is an $F$-basis for $R$ as an $F$-vector space.

This ring is not reversible since $xy=0$ but $yx\neq 0$.

If by "integral" you mean a domain, then this ring is clearly not a domain (since it isn't reversible).

It is not nilpotent, since it contains $1\neq 0$.

It is not finite if $F$ is an infinite field.

This ring is indecomposable, as the only idempotents are the trivial ones. (To see this, first note that the constant term of an idempotent $e$ must be idempotent, as this is a graded ring, graded by degree. After replacing $e$ by $1-e$ if necessary, we may assume the constant term is $0$. But then $e$ is nilpotent, and the only nilpotent idempotent is $0$.)

Every element in this ring without $1$ in its support is annihilated, from both the left and the right, by $yx$. As no element with $1$ in its support is a zero-divisor, there are no isolated elements.