Difference between revisions of "Messner, M. and M. Polborn (2004), Voting on Majority Rules"
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|Has page=Messner, M. and M. Polborn (2004), Voting on Majority Rules | |Has page=Messner, M. and M. Polborn (2004), Voting on Majority Rules | ||
|Has title=Voting on Majority Rules | |Has title=Voting on Majority Rules | ||
| − | |Has author= | + | |Has author=Messner, M. and M. Polborn |
|Has year=2004 | |Has year=2004 | ||
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Revision as of 12:23, 29 September 2020
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| Has author | Messner, M. and M. Polborn |
| Has year | 2004 |
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Return to BPP Field Exam Papers 2012
Intergenerational Conflict
- Voters born in continuous time and live for length 1
- Deaths equal birth, so continuous mass
- Some chance of reform opportunity
- Reforms cost, c, yeild value v element of [0, [math]\infty[/math]]
Results
- At any given time, median voter will be happy with simply majority
- However, median voter is only median for a split second, so if constitutional moment arises, he will choose super-majority
- While median voter prefer voting rule of [math]r(t_{m})=2c[/math] for a current project, he prefers [math]r(t_{m})=4c[/math] to decide on all future projects.
- rule of [math]r(t_{m})=4c[/math] corresponds to [math]t_{s}=\frac{3}{4}\gt \frac{1}{2}[/math]
- If we focus on welfare of all future generations obviously [math]t_{c}=\frac{1}{2}[/math]
- If we focus on welfare of all those currently alive [math]t_{c}=\frac{2}{3}[/math]
