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Subsets of Hardy-class zero sets in the ball.

Pascal J. Thomas (1990)

Publicacions Matemàtiques

We consider the problem of whether the union of complex hyperplanes can be a subset of a zero variety for the Hardy classes of the ball. A sufficient condition is found, consisting in a strong geometric separatedness requirement, together with a quantitative requirement slightly stronger than the necessary condition for Nevanlinna class zero varieties.

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