Projective models of Nikulin orbifolds
Abstract
We study projective fourfolds of K3[2]-type with a symplectic involution and the deformations of their quotients, called orbifolds of Nikulin types; they are IHS orbifolds. We compute the Riemann--Roch formula for Weil divisors on such orbifolds and describe the first complete family of orbifolds of Nikulin type with a polarization of degree 2 as double covers of special complete intersections (3,4) in P6.
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