Years and Authors of Summarized Original Work
1971; Shapley, Shubik
1982; Kelso, Crawford
1986; Demange, Gale and Sotomayor
Problem Definition
The study of matching market equilibrium was initiated by Shapley and Shubik [13] in an assignment model. A classical instance of the matching market involves a set B of n unit-demand buyers and a set Q of m indivisible items, where each buyer wants to buy at most one item and each item can be sold to at most one buyer. Each buyer i has a valuation v ij  ≥ 0 for each item j, representing the maximum amount that i is willing to pay for item j. Each item j has a reserve price r j  ≥ 0, below which it won’t be sold. Without loss of generality, one can assume there is a null item whose value is zero to all buyers and whose price is always zero.
An output of the matching market is a tuple (p, x), where p = (p1, …, p m ) ≥ 0 is a price vector with p j denoting the price charged for item j and x = (x1, …, x n ) ≥ 0 is an allocation vector with x...
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Chen N, Deng X (2011) On Nash dynamics of matching market equilibria. CoRR abs/1103.4196
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Chen, N., Li, M. (2016). Matching Market Equilibrium Algorithms. In: Kao, MY. (eds) Encyclopedia of Algorithms. Springer, New York, NY. https://doi.org/10.1007/978-1-4939-2864-4_788
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