The Singular Values of Lévy's Area Matrix

Abstract

The matrix of Lévy's areas of d-dimensional Brownian motion is a fundamental object in stochastic analysis. In this article, we study the singular values of this d × d skew-symmetric random matrix. First, we derive an explicit formula for the density of the singular values and, en passant, present a new short proof of the characteristic function of Lévy's area when d 3. This also allows us to extend the well-known formula for the density of Lévy's area to d 3. Next, we use these results to characterise the singular spectrum as a determinantal point process with its kernel in explicit form. Finally, we study the asymptotics as d ∞: the empirical measure of singular values converges to an absolute Cauchy distribution, the largest singular values are of order d with Gaussian fluctuations, the smallest singular values are of order 1/d, and the local bulk spacings are of order 1/d, with sine-kernel statistics after rescaling.