Middlemen in the Shapley-Shubik Competitive Markets
            for Indivisible Goods

Takayuki Oishi; Shin Sakaue

doi:10.1515/mel-2013-0024

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Middlemen in the Shapley-Shubik Competitive Markets for Indivisible Goods

Takayuki Oishi and Shin Sakaue

Published/Copyright: May 9, 2014

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From the journal Mathematical Economics Letters Volume 2 Issue 1-2

Abstract

We generalize the Shapley-Shubik market model for indivisible goods by considering the case where agents need middlemen to exchange their indivisible goods. In this model, there always exist competitive equilibria in which transaction takes place directly between sellers and buyers or indirectly through the middlemen. Furthermore, the incentives of middlemen to enter the market exist. We derive these results from the existence of an integral solution for a partitioning linear program.

Keywords: Middlemen; competitive equilibrium; partitioning linear program

JEL: C62; D50

Published Online: 2014-5-9

Published in Print: 2014-8-30

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Articles in the same Issue

https://doi.org/10.1515/mel-2013-0024

Keywords for this article

Middlemen; competitive equilibrium; partitioning linear program