Rigid stable vector bundles on hyperk\"ahler varieties of type K3[n]

Abstract

We prove existence and unicity of slope stable vector bundles on a general polarized hyperk\"ahler (HK) variety of type K3[n] with certain discrete invariants, provided the rank and the first two Chern classes of the vector bundle satisfy certain equalities. The latter hypotheses at first glance appear to be quite restrictive, but in fact we might have listed almost all slope stable rigid projectively hyperholomorphic vector bundles on polarized HK varieties of type K3[n] with 20 moduli.

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