Let (X, L) be a complex polarized n-fold with the structure of a classical scroll over a smooth projective threefold Y . The Hilbert curve of such a pair (X, L) is a complex affine plane curve of degree n, consisting of n − 3 evenly spaced parallel lines plus a cubic. This paper is devoted to a detailed study of this cubic. In particular, existence of triple points, behavior with respect to the line at infinity, and non-reducedness, are analyzed in connection with the structure of (X, L). Special attention is reserved to the case n = 4, where various examples are presented and the possibility that the cubic is itself the Hilbert curve of the base threefold Y for a suitable polarization is discussed.

Hilbert curves of scrolls over threefolds

Fania, Maria Lucia
;
2023-01-01

Abstract

Let (X, L) be a complex polarized n-fold with the structure of a classical scroll over a smooth projective threefold Y . The Hilbert curve of such a pair (X, L) is a complex affine plane curve of degree n, consisting of n − 3 evenly spaced parallel lines plus a cubic. This paper is devoted to a detailed study of this cubic. In particular, existence of triple points, behavior with respect to the line at infinity, and non-reducedness, are analyzed in connection with the structure of (X, L). Special attention is reserved to the case n = 4, where various examples are presented and the possibility that the cubic is itself the Hilbert curve of the base threefold Y for a suitable polarization is discussed.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11697/202300
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