On subordinate random walks
Abstract
In this article subordination of random walks in Rd is considered. We prove that subordination of random walks in the sense of [BSC12] yields the same process as subordination of L\'evy processes (in the sense of Bochner). Furthermore, we prove that appropriately scaled subordinate random walk converges to a multiple of a rotationally 2α-stable process if and only if the Laplace exponent of the corresponding subordinator varies regularly at zero with index α∈ (0,1].
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