Finite subgroups of PGL2(K) arising from configurations of skew lines in P3K

Abstract

We study finite groups arising from configurations of pairwise skew lines in P3K. To such a configuration L one associates a group GL⊂ PGL2(K) acting on each line, and we investigate which finite subgroups of PGL2(K) can occur in this way. Our main tool is a matrix description of skew lines in P3K, which gives explicit generators for GL in terms of matrices in GL2(K). In the abelian case, we prove that the relevant matrices are simultaneously upper triangular and obtain explicit families realizing cyclic groups and elementary abelian p-groups. In the non-abelian case, we show that, in non-modular characteristic, no dihedral group Dn with n 3 can occur, while configurations realizing A4, S4, and A5 are constructed explicitly. These results also yield new examples of point sets whose general projection is a complete intersection.