Hodge Structures in Sextic Fourfolds Equipped with an Involution
Abstract
To each ternary sextic f(X0, X1, X2) whose associated plane curve is smooth, the Shioda construction attaches a smooth sextic fourfold X ⊂ P5 whose defining equation f(X0, X1, X2) - f(Y0, Y1, Y2) is fixed under the involution : (X0, X1, X2, Y0, Y1, Y2) i · (Y0, Y1, Y2, -X0, -X1, -X2). The induced action * : H4(X, Q) H4(X, Q) fixes a Hodge substructure H ⊂ H4(X, Q) whose Hodge coniveau is 1. By the general Hodge conjecture, we expect that there should exist a divisor Y ⊂ X for which H ⊂ ( H4(X, Q) H4(X Y, Q) ). We verify this prediction in case the Waring rank of f(X0, X1, X2) takes on its minimum possible value, partially answering a question of Voisin (J. Math. Sci. Univ. Tokyo '15).
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