For random normal matrices, the scaled variance of eigenvalue count in an interior Borel set A converges to a boundary integral of sqrt(ΔQ) with respect to Hausdorff measure; a similar result holds near the droplet edge using harmonic measure.
Coulomb gas ensembles and Laplacian growth
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Universality for fluctuations of counting statistics of random normal matrices
For random normal matrices, the scaled variance of eigenvalue count in an interior Borel set A converges to a boundary integral of sqrt(ΔQ) with respect to Hausdorff measure; a similar result holds near the droplet edge using harmonic measure.