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When criterion #2 is used, this is equivalent to requiring that the winner always comes from the [[CDTT|Condorcet (doubly-augmented gross) top tier]] or [[CDTT]]. |
When criterion #2 is used, this is equivalent to requiring that the winner always comes from the [[CDTT|Condorcet (doubly-augmented gross) top tier]] or [[CDTT]]. |
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The most popular method which satisfies these properties is the [[Schulze method]]. |
The most popular method which satisfies these properties is the [[Schulze method]]. |
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== Notes == |
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== [[ISDA]] implies several of the criteria mentioned above. When there is a mutual majority and a minority with a preference among the mutual majority's preferred candidates, the ISDA-based reasoning for deciding who to elect is to eliminate everyone not in the mutual majority, check if there is a new mutual majority set, and then repeat. Taking the above example == |
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: 31 A > B > C |
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: 29 B > C > A |
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: 40 C > B > A |
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== There is a mutual majority of 69% of voters for B and C, so by ISDA, A can be eliminated. Then, there is a majority who put B as their 1st choice, and because ISDA implies the majority criterion, B wins. == |
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== A majority is a Droop quota in the single-winner case. == |
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[[Category:Voting theory]] |
[[Category:Voting theory]] |
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{{fromwikipedia}} |
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