Let G SL₃ (C) be a non-trivial finite group, acting on R = Cx₁, x₂, x₃. We continue our investigation from arXiv: 2505. 10683 math. RT into when the resulting skew-group algebra R G is a 3-preprojective algebra of a 2-representation infinite algebra. We consider the subgroups arising from GL₂ (C) SL₃ (C), called type (B), as well as the exceptional subgroups, called types (E) -- (L). For groups of type (B), we show that a 3-preprojective structure exists on R G if and only if G is not isomorphic to a subgroup of SL₂ (C) or PSL₂ (C). For groups G of the remaining types (E) -- (L), every R G admits a 3-preprojective structure, except for type (H) and (I). To prove our results for type (B), we explore how the notion of isoclinism interacts with the shape of McKay quivers. We compute the McKay quivers in detail, using a knitting-style heuristic. For the exceptional subgroups, we compute the McKay quivers directly, as well as cuts, and we discuss how this task can be done algorithmically. This provides many new examples of 2-representation infinite algebras, and together with arXiv: 2401. 10720 math. RT, arXiv: 2505. 10683 math. RT completes the classification of finite subgroups of SL₃ (C) for which R G is a 3-preprojective algebra.
Darius Dramburg (Thu,) studied this question.
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