A Law of large numbers for vector-valued linear statistics of Bergman DPP

Abstract

We establish a law of large numbers for a certain class of vector-valued linear statistics for the Bergman determinantal point process on the unit disk. Our result seems to be the first LLN for vector-valued linear statistics in the setting of determinantal point processes. As an application, we prove that, for almost all configurations X with respect to with respect to the Bergman determinantal point process, the weighted Poincar\'e series (we denote by dh(·,·) the hyperbolic distance on D) align* Σk=0∞Σx∈ X k dh(z,x)<k+1e-sdh(z,x)f(x) align* cannot be simultaneously convergent for all Bergman functions f∈ A2(D) whenever 1<s<3/2. This confirms a result announced without proof in Bufetov-Qiu's work.

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