On the Distribution of Zero Sets of Holomorphic Functions
Abstract
Let M be a subharmonic function with Riesz measure M in a domain D in the n-dimensional complex Euclidean space Cn, and let f be a nonzero function that is holomorphic in D, vanishes on a set Z⊂ D, and satisfies |f| ≤ M on D. Then restrictions on the growth of M near the boundary of D imply certain restrictions on the area/volume of Z. We give a quantitative study of this phenomenon in the subharmonic framework.
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