Abstract
We consider smooth linear statistics of determinantal point processes on the complex plane, and their large scale asymptotics. We prove asymptotic normality in the finite variance case, where Soshnikov’s theorem is not appli-cable. The setting is similar to that of Rider and Virág [Electron. J. Probab., 12, no. 45, 1238–1257, (2007)] for the complex plane, but replaces analyticity conditions by the assumption that the correlation kernel is reproducing. Our proof is a streamlined version of that of Ameur, Hedenmalm and Makarov [Duke Math J., 159, 31–81, (2011)] for eigenvalues of normal random matrices. In our case, the reproducing property is brought to bear to compensate for the lack of analyticity and radial symmetries.
| Original language | English |
|---|---|
| Pages (from-to) | 666-682 |
| Number of pages | 17 |
| Journal | Bernoulli |
| Volume | 30 |
| Issue number | 1 |
| DOIs | |
| Publication status | Published - Feb 2024 |
| MoE publication type | A1 Journal article-refereed |
Keywords
- Asymptotic normality
- determinantal point process
- linear statistics
- Weyl-Heisenberg DPP