On the Vinberg Family of K3 Surfaces
Abstract
We study orthogonal modular forms associated with moduli spaces of lattice-polarized K3 surfaces whose generic transcendental lattices are of the form T = H H L(-1) where L is a root lattice of type An or Dn. In Picard numbers 10 through 17, we use explicit Jacobian elliptic fibrations to construct modular forms on type IV domains associated with orthogonal groups O+(T). We show that the coefficients of suitable Weierstrass models naturally realize generators for the corresponding graded rings of orthogonal modular forms.
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