Constrained Trading Networks
Published Online:3 May 2023https://doi.org/10.1287/moor.2023.1362
References
- [1] (2020) Competitive equilibrium and trading networks: A network flow approach. Oper. Res. 69(1):114–147.Link, Google Scholar
- [2] (2003) A note on Kelso and Crawford’s gross substitutes condition. Math. Oper. Res. 28(3):463–469.Link, Google Scholar
- [3] (2019) Market design and Walrasian equilibrium. Working paper, Princeton University, Princeton, NJ.Google Scholar
- [4] (2013) Stability and competitive equilibrium in trading networks. J. Political Econom. 121(5):966–1005.Crossref, Google Scholar
- [5] (2015) Stability and competitive equilibria in multi-unit trading networks with discrete concave utility functions. Japanese J. Indust. Appl. Math. 32(2):373–410.Crossref, Google Scholar
- [6] (2018) Job matching under constraints. Amer. Econom. Rev. 110(9):2935–2947.Crossref, Google Scholar
- [7] (1973) Bounded production and inventory models with piecewise concave costs. Management Sci. 20(3):313–318.Link, Google Scholar
- [8] (2009) Assignment messages and exchanges. Amer. Econ. J. Microeconomics 1(2):95–113.Crossref, Google Scholar
- [9] (2003) Discrete Convex Analysis: Monographs on Discrete Mathematics and Applications 10 (Society for Industrial and Applied Mathematics, Philadelphia).Crossref, Google Scholar
- [10] (2021) A survey of fundamental operations on discrete convex functions of various kinds. Optim. Methods Software 36(2–3):472–518.Crossref, Google Scholar
- [11] (2003) Application of m-convex submodular flow problem to mathematical economics. Japanese J. Indust. Appl. Math. 20(3):257–277.Crossref, Google Scholar
- [12] (1959) A few remarks on the assortment problem. Management Sci. 6(1):13–24.Link, Google Scholar
- [13] (1971) The assignment game I: The core. Internat. J. Game Theory 1(1):111–130.Crossref, Google Scholar
- [14] (1964) Production planning with convex costs: A parametric study. Management Sci. 10(3):441–460.Link, Google Scholar
