Random walks in the high-dimensional limit II: The crinkled subordinator

A crinkled subordinator is an l(2)-valued random process which can be thought of as a version of the usual one-dimensional subordinator with each out of countably many jumps being in a direction orthogonal to the directions of all other jumps. We show that the path of a d-dimensional random walk with n independent identically distributed steps with heavytailed distribution of the radial components and asymptotically orthogonal angular components converges in distribution in the Hausdorff distance up to isometry and also in the Gromov-Hausdorff sense, if viewed as a random metric space, to the closed range of a crinkled subordinator, as d, n -> infinity.