Counting Groves-Ledyard equilibria via degree theory
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Publication:792203
DOI10.1016/0304-4068(83)90011-3zbMath0536.90018OpenAlexW1974249359MaRDI QIDQ792203
Charles J. Titus, Carl P. Simon, Theodore C. Bergstrom
Publication date: 1983
Published in: Journal of Mathematical Economics (Search for Journal in Brave)
Full work available at URL: https://hdl.handle.net/2027.42/101114
Nash equilibriumnumber of equilibriafree rider problemdegree theory on affine spacesGroves-Ledyard mechanismoptimal amounts of public goods
Related Items (2)
Cites Work
- Some results on uniqueness and on stability of equilibrium in general equilibrium theory
- Independence of Allocative Efficiency from Distribution in the Theory of Public Goods
- Homeomorphisms of Compact, Convex Sets and the Jacobian Matrix
- The Existence of Efficient and Incentive Compatible Equilibria with Public Goods
- Optimal Allocation of Public Goods: A Solution to the "Free Rider" Problem
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