Self-improving estimates of growth of subharmonic and analytic functions

Abstract

Given a bounded open subset and closed subsets A,B of Rk, we discuss when an estimate u(x) g(dist(x,A B)), x∈(A B), for a function u subharmonic on B, implies that u(x) h(dist(x,B)), x∈ B, where g,h:(0,∞) (0,∞) are decreasing functions and g(0+)=h(0+)=∞. We seek for explicit expressions of h in terms of g. We give some results of this type and show that Domar's work (On the existence of a largest subharmonic minorant of a given function, Ark. Mat., 3 (1957), pp. 429-440) permits one to deduce other results in this direction. Then we compare these two approaches. Similar results are deduced for estimates of analytic functions.