EPW sextics and Hilbert squares of K3 surfaces
Abstract
We prove that the Hilbert square S[2] of a very general primitively polarized K3 surface S of degree d(n) = 2(4n2 + 8n + 5), n ≥ 1 is birational to a double Eisenbud-Popescu-Walter sextic. Our result implies a positive answers, in the case when r is even, to a conjecture of O'Grady: On the Hilbert square of a very general K3 surface of genus r2 + 2, r ≥ 1 there is an antisymplectic involution. We explicitly give this involution on S[2] in term of the corresponding EPW polarization on it.
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