Invariant monotone coupling need not exist

Péter Mester

doi:10.1214/12-AOP767

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Home > Journals > Ann. Probab. > Volume 41 > Issue 3A > Article

May 2013 Invariant monotone coupling need not exist

Péter Mester

Ann. Probab. 41(3A): 1180-1190 (May 2013). DOI: 10.1214/12-AOP767

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Abstract

We show by example that there is a Cayley graph, having two invariant random subgraphs $X$ and $Y$, such that there exists a monotone coupling between them in the sense that $X\subset Y$, although no such coupling can be invariant. Here, “invariant” means that the distribution is invariant under group multiplications.