Let $A$ be a finite dimensional Frobenius algebra and $e$ and idempotent of $A$. It is well known that the algebra $eAe$ does not have to be a Frobenius algebra. But if $A$ is additionally symmetric, then $eAe$ is also a symmetric Frobenius algebra for any idempotent $e$.
The Frobenius algebra $A$ is called weakly symmetric if for every indecomposable projective module $P$: $top(P)=soc(P)$.
Question: If $A$ is just weakly symmetric, is $eAe$ also always weakly-symmetric for any idempotent $e$?
Yes.
Using left modules, the indecomposable projective $eAe$-modules are $eP$ for $P$ an indecomposable projective $A$-module such that $e\operatorname{top}(P)=\operatorname{top}(P)$, and in this case $\operatorname{top}(eP)=\operatorname{top}(P)$.
For any finite-dimensional $A$-module $M$ such that $\operatorname{soc}(M)=e\operatorname{soc}(M)$, we have $\operatorname{soc}(eM)=\operatorname{soc}(M)$. Thus for the relevant indecomposable projectives we also have $\operatorname{soc}(eP)=\operatorname{soc}(P)$, and the result follows.
