Bergman-Bourgain-Brezis-type Inequality

Abstract

In this note, we prove a fractional version in 1-D of the Bourgain-Brezis inequality bourgain1. We show that such an inequality is equivalent to the fact that a holomorphic function f belongs to the Bergman space A2(), namely f∈ L2(), if and only if \|f\| L1+ H-1/2(S1):=r 1-\|f(reiθ)\| L1+ H-1/2(S1)<+∞. Possible generalisations to the higher-dimensional torus are explored.