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Given a complex manifold containing a relatively compact Z (q) domain, we give sufficient geometric conditions on the domain so that its L²-cohomology in degree (p, q) (known to be finite dimensional) vanishes. The condition consists of the existence of a smooth weight function in a neighborhood of the closure of the domain, where the complex Hessian of the weight has a prescribed number of eigenvalues of a particular sign, along with good interaction at the boundary of the Levi form with the complex Hessian, encoded in a subbundle of common positive directions for the two Hermitian forms.
Chakrabarti et al. (Thu,) studied this question.