Lower bounds for subharmonic functions in terms of the Harnack distance

Abstract

Let G be a nonempty bounded domain in a finite-dimensional Euclidean space. The main results are general estimates from below at points from G for an arbitrary subharmonic function u -∞ on the closure of the domain G through the maximum of the function u on the boundary of the domain G. These results are new for planar domains G, and for intervals of G on the numerical line have also not been previously noted. They show that the Harnack distance plays a key role in these estimates. Further applications to subharmonic, convex, holomorphic functions, as well as to meromorphic functions and differences of subharmonic functions in domains of a particular type are supposed to be outlined in the continuation of this article.

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