HK manifolds of Type K3[a2+1] as moduli spaces of projective bundles on HK manifolds of Type K3[2]

Abstract

We prove results on moduli spaces of slope stable bundles of projective spaces on a hyperkähler manifold of Type K3[2]. Let X be projective of Type K3[2] and h be a (generic) ample class. We prove that the moduli space M wa(X,h) parametrizing h slope stable bundles with a suitable mock Mukai vector wa contains an irreducible component M wa(X,h)* whose normalization M wa(X,h)* is a (projective) HK manifold of Type K3[a2+1], and that conversely every projective HK manifold W of Type K3[a2+1] is isomorphic to M wa(X,h)* for a suitable (X,h) as above. Moreover the universal bundle of projective spaces on X× M wa(X,h)* defines a vector bundle whose 2nd Chern class defines a rational Hodge isometry H2(X) H2(M wa(X,h)*). From this and a result of Markman one gets that the analogue of the Shafarevich conjecture (a special case of the Hodge conjecture) holds for rational Hodge isometries H2(W1) H2(W2) between projective hyperkähler manifolds W1,W2 of Types K3[a12+1] and K3[a22+1] respectively. We prove results also for (X,ω) a general HK manifold of Type K3[2]. In fact one ingredient in our proof is Verbistsky's theory of projectively hyperhomolorphic vector bundles.