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Notes on computational complexity of GE inequalities
Brown, Donald J. - 2012
Persistent link: https://www.econbiz.de/10009574757
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Approximate Solutions of the Walrasian Equilibrium Inequalities with Bounded Marginal Utilities of Income
Brown, Donald - 2014
Recently Cherchye et al. (2011) reformulated the Walrasian equilibrium inequalities, introduced by Brown and Matzkin (1996), as an integer programming problem and proved that solving the Walrasian equilibrium inequalities is NP-hard. Brown and Shannon (2002) derived an equivalent system of...
Persistent link: https://www.econbiz.de/10013049146
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Approximate Solutions of Walrasian Equilibrium Inequalities with Bounded Marginal Utilities of Income
Brown, Donald - 2014
Recently Cherchye et al. (2011) reformulated the Walrasian equilibrium inequalities, introduced by Brown and Matzkin (1996), as an integer programming problem and proved that solving the Walrasian equilibrium inequalities is NP-hard. Brown and Shannon (2002) derived an equivalent system of...
Persistent link: https://www.econbiz.de/10013046119
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Notes on Computational Complexity of GE Inequalities
Brown, Donald - 2012
This paper is a revision of my paper, CFDP 1865. The principal innovation is an equivalent reformulation of the decision problem for weak feasibility of the GE inequalities, using polynomial time ellipsoid methods, as a semidefinite optimization problem, using polynomial time interior point...
Persistent link: https://www.econbiz.de/10014166367
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Notes on Computational Complexity of GE Inequalities
Brown, Donald - 2012
Recently, Cheryche et al. (2011) proved the important negative result that deciding the strong feasibility of the Marshallian equilibrium inequalities, introduced by Brown and Matzkin (1996), is NP-complete. Here, I show that the weak feasibility of the equivalent Hicksian equilibrium...
Persistent link: https://www.econbiz.de/10014168024
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Approximate Solutions of Walrasian and Gorman Polar Form Equilibrium Inequalities
Brown, Donald - 2015
Recently Cherchye et al. (2011) reformulated the Walrasian equilibrium inequalities, introduced by Brown and Matzkin (1996), as an integer programming problem and proved that solving the Walrasian equilibrium inequalities is NP-hard. Following Brown and Shannon (2000), we reformulate the...
Persistent link: https://www.econbiz.de/10013029785