New posts in verbal-subgroups

Is it true, that for any two non-isomorphic finite groups $G$ and $H$ there exists such a group word $w$, that $|V_w(G)| \neq |V_w(H)|$?

abstract-algebra group-theory finite-groups universal-algebra verbal-subgroups

Does there exist some sort of classification of finite verbally simple groups?

abstract-algebra group-theory finite-groups verbal-subgroups characteristic-subgroups