Radial Balanced metrics on the unit disk

Abstract

Let be a strictly plurisubharmonic and radial function on the unit disk D⊂ and let g be the metric associated to the form ω =i2∂∂. We prove that if g is geucl-balanced of height 3 (where geucl is the standard Euclidean metric on =2), and the function h(x)=e- (z), x=|z|2, extends to an entire analytic function on , then g equals the hyperbolic metric. The proof of our result is based on a interesting characterization of the function f(x)=1-x.