We study the period map for double EPW-sextics, which are varieties making up a locally versal family of polarized hyperkaehler fourfolds. Double EPW-sextics are parametrized by Lagrangian subspaces of the third wedge-product of a 6-dimensional complex vector space. We prove that Lagrangians in the indeterminacy locus of the period map contain a decomposable 3-vector enjoying very special properties. In addition we prove a result about periods of double EPW-sextics which are either smooth or have isolated singular points with projectivized tangent cone isomorphic to the incidence variety in P2 × (P2)∨.
Periods of double EPW-sextics / O'Grady, Kieran Gregory. - In: MATHEMATISCHE ZEITSCHRIFT. - ISSN 0025-5874. - STAMPA. - (2015). [10.1007/s00209-015-1434-7]
Periods of double EPW-sextics
O'GRADY, Kieran Gregory
2015
Abstract
We study the period map for double EPW-sextics, which are varieties making up a locally versal family of polarized hyperkaehler fourfolds. Double EPW-sextics are parametrized by Lagrangian subspaces of the third wedge-product of a 6-dimensional complex vector space. We prove that Lagrangians in the indeterminacy locus of the period map contain a decomposable 3-vector enjoying very special properties. In addition we prove a result about periods of double EPW-sextics which are either smooth or have isolated singular points with projectivized tangent cone isomorphic to the incidence variety in P2 × (P2)∨.| File | Dimensione | Formato | |
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