Limiting behavior of determinantal point processes associated with weighted Bergman kernels
Abstract
Let be a bounded pseudoconvex domain in Cn, and let φ be a strictly plurisubharmonic function on . For each k∈N, we consider determinantal point process k with kernel Kkφ, where Kkφ is the reproducing kernel of infinite dimensional weighted Bergman space H(kφ) with weight e-kφ. We show that the scaled cumulant generating function for k converges as k→∞ to a certain limit, which can be explicitly expressed in terms of φ and a test function u. Note that we need to restrict the type of test function u to those that are φ-admissible.
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