A radial invariance principle for non-homogeneous random walks
Abstract
Consider non-homogeneous zero-drift random walks in Rd, d ≥ 2, with the asymptotic increment covariance matrix σ2 (u) satisfying u σ2 (u) u = U and tr\ σ2 (u) = V in all in directions u∈Sd-1 for some positive constants U<V. In this paper we establish weak convergence of the radial component of the walk to a Bessel process with dimension V/U. This can be viewed as an extension of an invariance principle of Lamperti.
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