Given a finite dimensional quiver algebra A, define $S_A$ as the set of quiver algebras derived equivalent to $A$ (up to isomorphism).
Questions:

1. Can one characterise algebras $A$,where $S_A$ is a finite set?
2. Can one characterise algebras $A$, where $S_A$ has cardinality 1? (For example local algebras)
3. Can one compute $S_A$ when $A$ is the Nakayama algebra with Kupisch series [2,3]?
4. Can one give examples of algebras $A_n$ with $S_{A_n}$ having cardinality $n$?