English

On a limiting point process related to modified permutation matrices

Probability 2018-03-12 v1

Abstract

We consider random permutation matrices following a one-parameter family of deformations of the uniform distribution, called Ewens' measures, and modifications of these matrices where the entries equal to one are replaced by i.i.d uniform random variables on the unit circle. For each of these two ensembles of matrices, rescaling properly the eigenangles provides a limiting point process as the size of the matrices goes to infinity. If JJ is an interval of R\mathbb{R}, we show that, as the length of JJ tends to infinity, the number of points lying in JJ of the limiting point process related to modified permutation matrices is asymptotically normal. Moreover, for permutation matrices without modification, if aa and a+ba+b denote the endpoints of JJ, we still have an asymptotic normality for the number of points lying in JJ, in the two following cases: [aa fixed and bb \to \infty] and [a,ba,b \to \infty with bb proportional to aa].

Keywords

Cite

@article{arxiv.1803.03546,
  title  = {On a limiting point process related to modified permutation matrices},
  author = {Valentin Bahier},
  journal= {arXiv preprint arXiv:1803.03546},
  year   = {2018}
}
R2 v1 2026-06-23T00:47:47.381Z