Preorders on Subharmonic Functions and Measures with Applications to the Distribution of Zeros of Holomorphic Functions

Abstract

Let X be a class of extended numerical functions on a domain D of d-dimensional Euclidean space Rd, H⊂ X. Given u,M∈ X, we write uH M if there is a function h∈ H such that u+h≤ M on D. We consider this special preorder H for a pair of subharmonic unctions u, M on D in cases where H is the space of all harmonic functions on D or H is the convex cone of all subharmonic functions h -∞ on D. Main results are dual equivalent forms for this preorder H in terms of balayage processes for Riesz measures of subharmonic functions u and M, for Jensen and Arens-Singer (representing) measures, for potentials of these measures, and for special test functions generated by subharmonic functions on complements D S of non-empty precompact subsets S D. Applications to holomorphic functions f on a domain D⊂ Cn relate to the distribution of zero sets of functions f under upper restrictions |f|≤ M on D. If a domain D⊂ C is a finitely connected domain with non-empty exterior or a simply connected domain with two different points on the boundary of D, then our conditions for the distribution of zeros of f≠ 0 with |f|≤ M on D are both necessary and sufficient.