$Power law Polya's urn and fractional Brownian motion$

Power law Polya's urn and fractional Brownian motion

We introduce a natural family of random walks on the set of integers that scale to fractional Brownian motion. The increments X_n have the property that given {X_k: k < n}, the conditional law of X_n is that of X_{n-k_n}, where k_n is sampled independently from a fixed law \mu on the positive...

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Bibliographic Details
Main Authors:	Hammond, A, Sheffield, S
Format:	Journal article
Published:	2009

Power law Polya's urn and fractional Brownian motion

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