Complex ball quotients from manifolds of K3[n]-type
Abstract
We describe periods of irreducible holomorphic manifolds of K3[n]-type with a non-symplectic automorphism of prime order p≥ 3. These turn out to lie on complex ball quotients and we are able to give a precise characterization of when the period map is bijective, by introducing the notion of K(T)-generality.
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