Recall that a finite dimensional quiver (always assume connected quiver) algebra is selfinjective iff $P(S) \rightarrow P(socP)$ is a permutation (called the nakayama permutation), when S is simple and P(-) denotes the projective cover. Is there a nice class of $n!$ connected quiver algebras with n simples such that their nakayama permutations realise every of the n! permutations? If possible they should all have the same quiver and just differ by their relations.
Example of "nice class" would be for example selfinjective Nakayama algebras, but they realise only n out of n! many permutations. I can not formally define nice but somehow the algebras should be very similar, like in the nakayama case: All have the same quiver and just different Loewy length mod n. Bonus question: Can you find such a nice class realising all permutations among the representation-finite selfinjective algebras? If not, is there a particular nice class of selfinjective algebras realising the permutations, which also appeared somewhere else (maybe even in applied geometric representation-theory).