One-radius results for supermedian functions on Rd, d 2

Abstract

A classical result states that every lower bounded superharmonic function on R2 is constant. In this paper the following (stronger) one-circle version is proven. If f R2 (-∞,∞] is lower semicontinuous, |x|∞ f(x)/|x| 0, and, for every x∈ R2, 1/(2π) ∫02π f(x+r(x)eit) dt f(x), where r R2 (0,∞) is continuous, x∈ R2 (r(x)-|x|)<∞, and ∈fx∈ R2 (r(x)-|x|)=-∞, then f is constant. Moreover, it is shown that, with respect to the assumption r c|·|+M on Rd, there is a striking difference between the restricted volume mean property for the cases d=1 and d=2.