Rigid and stably balanced curves on Calabi-Yau and general-type hypersurfaces
Abstract
A curve C on a variety X is stably balanced if the slopes of the Harder-Narasimhan filtration of its normal bundle N are contained in an interval of length 1. For each d≥ n+1 we construct some regular families of pairs (C, X) of the expected dimension with X a hypersurface of degree d in Pn and C a stably balanced rigid curve on X, such that the family of hypersurfaces X is smooth codimension h1(N) in the space of hypersurfaces.
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