Regular and rigid curves on some Calabi-Yau and general-type complete intersections

Abstract

Let X be either a general hypersurface of degree n+1 in Pn or a general (2,n) complete intersection in Pn+1, n≥ 4. We construct balanced rational curves on X of all high enough degrees. If n=3 or g=1, we construct rigid curves of genus g on X of all high enough degrees. As an application we construct some rigid bundles on Calabi-Yau threefolds. In addition, we construct some low-degree balanced rational curves on hypersurfaces of degree n + 2 in Pn.

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