Holomorphic bundles on diagonal Hopf manifolds

Abstract

Let A be a diagonal linear operator on n, with all eigenvalues satisfying 0<|αi|<1, and M = (n 0)/<A> the corresponding Hopf manifold. We show that any stable holomorphic bundle on M can be lifted to a G-equivariant coherent sheaf on n, where G=(*)l is a Lie group acting on n and containing A. This is used to show that all stable bundles on M are filtrable, that is, admit a filtration by a sequence Fi of coherent sheaves, with all subquotients Fi/Fi-1 of rank 1.

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