On the Distribution of Zero Sets of Holomorphic Functions. IV. A Criterion (1812.11716v1)

Abstract: Let $D$ be a proper domain in the extended complex plane ${\mathbb C}{\infty}:={\mathbb C}\cup {\infty}$, $M=M+-M_-\not\equiv \pm \infty$ be a difference of non-trivial subharmonic functions $M_{\pm}\not\equiv \mp \infty$ on $D$, $\text{Hol}(D,M)$ be the class of holomorphic function $f$ on $D$ satisfying $|f|\leq \text{const}_f\exp M$ om $D$, ${\sf Z}\subset D$ be a sequence of points in $D$ without limits points in $D$. We give a complete description of the conditions under which the sequence $\sf Z$ is a sequence of all zeros for some nonzero function $f\in \text{Hol}(D,M)$.