Families of stable bundles on the fibres of the hyperk\"ahler twistor projection

Abstract

Given a holomorphic vector bundle E on the twistor space Tw(M) of a simple hyperk\"ahler manifold M, we view it as a family of bundles \EI\ on the fibres π-1(I) of the twistor projection π : Tw(M) CP1, and study the relationship between stability of E and its fibrewise stability. We verify that the argument of Teleman establishing the Zariski openness of stability and semi-stability in families of bundles applies in the case of the family \EI\. We prove a partial converse to a result of Kaledin and Verbitsky, showing that an irreducible bundle E on Tw(M) is generically fibrewise stable if the rank of E is 2 or 3, or at least one element of the family \EI\ is a simple bundle, in the sense that Hom(EI, EI) = C.