The rank of a random triangular matrix over Fq
Abstract
We consider uniformly random strictly upper-triangular matrices in Matn(Fq). For such a matrix An, we show that n-rank(An) ≈ q n as n ∞, and find that the fluctuations around this limit are finite-order and given by explicit Z-valued random variables. More generally, we consider the random partition whose parts are the sizes of the nilpotent Jordan blocks of An: its k largest parts (rows) were previously shown by Borodin to have jointly Gaussian fluctuations as N ∞, and its columns correspond to differences rank(Ani-1) - rank(Ani). We show the fluctuations of the columns converge jointly to a discrete random point configuration Lt, introduced in arXiv:2310.12275. The proofs use an explicit integral formula for the probabilities at finite N, obtained by de-Poissonizing a corresponding one in arXiv:2310.12275, which is amenable to asymptotic analysis.
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