Limit theorems for radial random walks on Euclidean spaces of high dimensions

Abstract

Let ∈ M1([0,∞[) be a fixed probability measure. For each dimension p∈ N, let (Xnp)n≥1 be i.i.d. Rp-valued random variables with radially symmetric distributions and radial distribution . We investigate the distribution of the Euclidean length of Snp:=X1p+...+ Xnp for large parameters n and p. Depending on the growth of the dimension p=pn we derive by the method of moments two complementary CLT's for the functional |Snp|2 with normal limits, namely for n/pn ∞ and n/pn 0. Moreover, we present a CLT for the case n/pn c∈]0,∞[. Thereby we derive explicit formulas and asymptotic results for moments of radial distributed random variables on Rp. All limit theorems are considered also for orthogonal invariant random walks on the space Mp,q( R) of p× q matrices instead of Rp for p ∞ and some fixed dimension q.