Ulrich bundles on Del Pezzo threefolds

Abstract

We prove that for any r ≥ 2 the moduli space of stable Ulrich bundles of rank r and determinant OX(r) on any smooth Fano threefold X of index two is smooth of dimension r2+1 and that the same holds true for even r when the index is four, in which case no odd--rank Ulrich bundles exist. In particular this shows that any such threefold is Ulrich wild. As a preliminary result, we give necessary and sufficient conditions for the existence of Ulrich bundles on any smooth projective threefold in terms of the existence of a curve in the threefold enjoying special properties.

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