On the normal bundle of submanifolds of Pn

Abstract

Let X be a submanifold of dimension d≥ 2 of the complex projective space Pn. We prove results of the following type. i) If X is irregular and n=2d then the normal bundle NX| Pn is indecomposable. ii) If X is irregular, d≥ 3 and n=2d+1 then NX| Pn is not the direct sum of two vector bundles of rank ≥ 2. iii) If d≥ 3, n=2d-1 and NX| Pn is decomposable then the natural restriction map ( Pn)(X) is an isomorphism (and in particular, if X= Pd-1× P1 embedded Segre in P2d-1 then NX| P2d-1 is indecomposable). iv) Let n≤ 2d and d≥ 3, and assume that NX| Pn is a direct sum of line bundles; if n=2d assume furthermore that X is simply connected and OX(1) is not divisible in (X). Then X is a complete intersection. These results follow from Theorem exact5 below together with Le Potier vanishing theorem. The last statement also uses a criterion of Faltings for complete intersection. In the case when n<2d this fact was proved by M. Schneider in 1990 in a completely different way.

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