On the jumping phenomenon of CHq(Xt,Et)

Abstract

Let X be a compact complex manifold and E be a holomorphic vector bundle on X. Given a deformation (X,E) of the pair (X,E) over a small polydisk B centered at the origin, we study the jumping phenomenon of the cohomology groups CHq(Xt,Et) near t = 0. Generalizing previous results of X. Ye for the tangent bundle E = TXt and exterior powers of the cotangent bundle E = pXt, we show that there are precisely two cohomological obstructions to the stability of CHq(Xt,Et), which can be expressed explicitly in terms of the Maurer-Cartan element associated to the deformation (X,E). As an application, we study the jumping phenomenon of the dimension of the cohomology group H1(Xt,End(TXt)) which is related to a question raised by physicists.