Limit theorems for radial random walks on pxq-matrices as p tends to infinity
Abstract
The radial probability measures on Rp are in a one-to-one correspondence with probability measures on [0,∞[ by taking images of measures w.r.t. the Euclidean norm mapping. For fixed ∈ M1([0,∞[) and each dimension p, we consider i.i.d. Rp-valued random variables X1p,X2p,... with radial laws corresponding to as above. We derive weak and strong laws of large numbers as well as a large deviation principle for the Euclidean length processes Skp:=\|X1p+...+Xkp\| as k,p∞ in suitable ways. In fact, we derive these results in a higher rank setting, where Rp is replaced by the space of p× q matrices and [0,∞[ by the cone q of positive semidefinite matrices. Proofs are based on the fact that the (Skp)k 0 form Markov chains on the cone whose transition probabilities are given in terms Bessel functions Jμ of matrix argument with an index μ depending on p. The limit theorems follow from new asymptotic results for the Jμ as μ ∞. Similar results are also proven for certain Dunkl-type Bessel functions.
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