Random Bridges in Spaces of Growing Dimension
Abstract
We investigate the limiting behaviour of the path of random bridges treated as random sets in Rd with the Euclidean metric and the dimension d increasing to infinity. The main result states that, in the square integrable case, the limit (in the Gromov-Hausdorff sense) is deterministic, namely, it is [0,1] equipped with the pseudo-metric |t-s|(1-|t-s|). We also show that, in the heavy-tailed case with summands regularly varying of order α ∈ (0,1), the limiting metric space has a random metric derived from the bridge variant of a subordinator.
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