Invariant Smooth Quartic Surfaces by all Finite Primitive Groups of PGL4(C)

Abstract

For each finite primitive subgroup G of PGL4(C), we find all the smooth G-invariant quartic surfaces. We also find all the faithful representations in PGL4(C) of the smooth quartic G-invariant surfaces by the groups: A5,S5, PSL2(F7),A6,Z245 and Z24 D10. The primitive representation of these groups are precisely the subgroups of PGL4(C) for which P3 is not G-super rigid. As a byproduct, we show that the smooth quartic surface with the biggest group of projective automorphism is given by \ x04 + x14 + x24 + x34 + 12 x0 x1 x2 x3= 0\ (unique up to projective equivalence).

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