Rigidity theorems by capacities and kernels

Abstract

For any open hyperbolic Riemann surface X, the Bergman kernel K, the logarithmic capacity cβ, and the analytic capacity cB satisfy the inequality chain π K ≥ c2β ≥ c2B; moreover, equality holds at a single point between any two of the three quantities if and only if X is biholomorphic to a disk possibly less a relatively closed polar set. We extend the inequality chain by showing that cB2 ≥ π v-1(X) on planar domains, where v(·) is the Euclidean volume, and characterize the extremal cases when equality holds at one point. Similar rigidity theorems concerning the Szeg\"o kernel, the higher-order Bergman kernels, and the sublevel sets of the Green's function are also developed. Additionally, we explore rigidity phenomena related to the multi-dimensional Suita conjecture.