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Transportation of diffuse random measures on $\mathbb{R}^d$

Published 24 Dec 2021 in math.PR | (2112.13053v2)

Abstract: We consider two jointly stationary and ergodic random measures $\xi$ and $\eta$ on $\mathbb{R}d$ with equal finite intensities, assuming $\xi$ to be diffuse. An allocation is a random mapping taking $\mathbb{R}d$ to $\mathbb{R}d\cup{\infty}$ in a translation invariant way. We construct allocations transporting the diffuse $\xi$ to arbitrary $\eta$, under the mild condition of existence of an `auxiliary' point process which is needed only in the case when $\eta$ is diffuse. When that condition does not hold we show by a counterexample that an allocation transporting $\xi$ to $\eta$ need not exist.

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