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Dynamic Weighted Matching with Heterogeneous Arrival and Departure Rates

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 Added by Brendan Lucier
 Publication date 2020
and research's language is English




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We study a dynamic non-bipartite matching problem. There is a fixed set of agent types, and agents of a given type arrive and depart according to type-specific Poisson processes. Agent departures are not announced in advance. The value of a match is determined by the types of the matched agents. We present an online algorithm that is (1/8)-competitive with respect to the value of the optimal-in-hindsight policy, for arbitrary weighted graphs. Our algorithm treats agents heterogeneously, interpolating between immediate and delayed matching in order to thicken the market while still matching valuable agents opportunistically.



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87 - Marcus Kaiser 2020
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