The Bergman analytic content of planar domains

Abstract

Given a planar domain , the Bergman analytic content measures the L2()-distance between z and the Bergman space A2(). We compute the Bergman analytic content of simply-connected quadrature domains with quadrature formula supported at one point, and we also determine the function f ∈ A2() that best approximates z. We show that, for simply-connected domains, the square of Bergman analytic content is equivalent to torsional rigidity from classical elasticity theory, while for multiply-connected domains these two domain constants are not equivalent in general.