Irreducible Holomorphic Symplectic manifolds with an action of Z43 : A6

Abstract

H\"ohn and Mason classified the possible symplectic groups acting on an Irreducible Holomorphic Symplectic (IHS) manifold of K3[2]-type, finding that Z34 : A6 is the symplectic group with the biggest order. In this paper, we study the possible IHS manifolds of K3[2]-type with a symplectic action of Z34 : A6 and also admitting a non-symplectic automorphism. We characterize such IHS manifolds. In particular we prove that there exists a IHS manifold of K3[2]-type with finite automorphism group of order 174960, the biggest possible order for the automorphism group of a IHS manifold of K3[2]-type, and it is the Fano variety of lines of the Fermat cubic fourfold.