Rigid hyperholomorphic sheaves remain rigid along twistor deformations of the underlying hyparkahler manifold

Abstract

Let S be a K3 surface and M a smooth and projective 2n-dimensional moduli space of stable coherent sheaves on S. Over M x M there exists a rank 2n-2 reflexive hyperholomorphic sheaf EM, whose fiber over a non-diagonal point (F,G) is Ext1(F,G). The sheaf EM can be deformed along some twistor path to a sheaf EX over the cartesian square of every Kahler manifold X deformation equivalent to M. We prove that EX is infinitesimally rigid, and the isomorphism class of the Azumaya algebra End(EX) is independent of the twistor path chosen. This verifies conjectures in arXiv:1310.5782 and arXiv:1507.03108 on non-commutative deformations of K3 surfaces and renders the results of these two papers unconditional.