ACM vector bundles on prime Fano threefolds and complete intersection Calabi Yau threefolds

Abstract

In this paper we derive a list of all the possible indecomposable normalized rank--two vector bundles without intermediate cohomology on the prime Fano threefolds and on the complete intersection Calabi Yau threefolds, say V, of Picard number =1. For any such bundle , if it exists, we find the projective invariants of the curves C ⊂ V which are the zero-locus of general global sections of . In turn, a curve C ⊂ V with such invariants is a section of a bundle from our lists. This way we reduce the problem for existence of such bundles on V to the problem for existence of curves with prescribed properties contained in V. In part of the cases in our lists the existence of such curves on the general V is known, and we state the question about the existence on the general V of any type of curves from the lists.

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