Bloch functions and asymptotic tail variance

Abstract

We obtain an optimal exponential square integrability theorem for the Bergman projection of a function bounded by 1 in modulus. This is interpreted as the statement that the asymptotic tail variance of such a function is at most 1. The asymptotic tail variance defines a seminorm on the Bloch space. We apply the main result to quasiconformal Teichm\"uller theory, and obtain an estimate of the integral means spectrum of k-quasiconformal mappings that are conformal in the exterior disk: B(k,t)14k2|t|2(1+7k)2. This is conjectured asymptotically sharp as k tends to 0, by Prause and Smirnov (2011).