Let $k$ be a field, $A$ a finite dimensional $k$-Algebra, $\text{mod}\,A$ the category of finite dimensional left $A$-modules and $\text{rad}_A$ the collection of radical morphisms in $\text{mod}\,A$. For a natural number $n$ we denote by $\text{rad}_A^n$ the collection of $n$ compositions of morphisms in $\text{rad}_A$ and set $\text{rad}_A^{\omega} := \bigcap_{n\in \mathbb{N}} \text{rad}_A^n$. It is well-known that if $A$ is of infinite representation type, then $\text{rad}_A^{\omega}\neq 0$. However, in every example it seems to be that we always have $(\text{rad}_A^{\omega})^2 \neq 0$ aswell.
Question: Is it always true that if $A$ is of infinite representation type, then $(\text{rad}_A^{\omega})^2 \neq 0$?
