On the sub-additivity of stochastic matching
Abstract
We consider a stochastic matching model with a general compatibility graph, as introduced in MaiMoy16. We prove that most common matching policies (including FCFM, priorities and random) satisfy a particular sub-additive property, which we exploit to show in many cases, the coupling-from-the-past to the steady state, using a backwards scheme \`a la Loynes. We then use these results to explicitly construct perfect bi-infinite matchings, and to build a perfect simulation algorithm in the case where the buffer of the system is finite.
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