Coherent sheaves on subvarieties in Hopf manifolds

Abstract

We prove a version of GAGA theorem for a normal complex analytic variety X equipped with an invertible holomorphic contraction γ with center in x. We show that X admits a natural structure of an affine variety, and any γ-equivariant complex analytic reflexive coherent sheaf on X admits a natural algebraic structure. We prove a structure theorem for X0:=X x, showing that it admits a proper action of C*, and is isomorphic to the space of non-zero vectors in the total space of an ample line bundle over the projective variety Z:= X0/ C* equipped with an orbifold structure. We show that the quotient M:=X0/γ admits a holomorphic embedding to a Hopf manifold, and, conversely, any normal subvariety M in a Hopf manifold is obtained this way. We prove a form of structure theorem, showing that any reflexive coherent sheaf on M, M > 2, admits a filtration such that its associated graded subquotients, tensored with an appropriate line bundle, are obtained as pullbacks of coherent sheaves on the projective variety Z=X0/ C*. This is used to show that any reflexive coherent sheaf on M is filtrable, that is, admits a filtration with associated graded quotients of rank ≤ 1.