Central Limit Theorems for Radial Random Walks on p× q Matrices for p∞

Abstract

Let ∈ M1([0,∞[) be a fixed probability measure. For each dimension p∈ N, let (Xnp)n1 be i.i.d. Rp-valued radial random variables with radial distribution . We derive two central limit theorems for \|X1p+...+Xnp\|2 for n,p∞ with normal limits. The first CLT for n>>p follows from known estimates of convergence in the CLT on Rp, while the second CLT for n<<p will be a consequence of asymptotic properties of Bessel convolutions. Both limit theorems are considered also for U(p)-invariant random walks on the space of p× q matrices instead of Rp for p∞ and fixed dimension q.