Describes the geometry of a surface D_S in the projectivized cotangent bundle P(Ω_S) of a general degree-two polarized K3 surface S, playing a role similar to the bitangent surface of a quartic.
Algebraic integrability of foliations with numerically trivial canonical bundle
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Lower bound in terms of q(H) for Ω_X ⊗ H to be pseudoeffective on hyperkähler X with ample H; explicit version and optimality check when X deforms to a K3 Hilbert scheme.
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The cotangent bundle of K3 surfaces of degree two
Describes the geometry of a surface D_S in the projectivized cotangent bundle P(Ω_S) of a general degree-two polarized K3 surface S, playing a role similar to the bitangent surface of a quartic.
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Twisted cotangent bundles of Hyperk\"ahler manifolds
Lower bound in terms of q(H) for Ω_X ⊗ H to be pseudoeffective on hyperkähler X with ample H; explicit version and optimality check when X deforms to a K3 Hilbert scheme.