Sequential dropping: Difference between revisions
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Differs from minmax only in the "that's in a cycle" proviso. As a result of that proviso, sequential dropping is Smith-efficient. Unlike [[Schulze method|Schulze]], [[ranked pairs]], and [[river]], sequential dropping fails monotonicity and clone independence. |
Differs from minmax only in the "that's in a cycle" proviso. As a result of that proviso, sequential dropping is Smith-efficient. Unlike [[Schulze method|Schulze]], [[ranked pairs]], and [[river]], sequential dropping fails monotonicity and clone independence. |
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[[Category:Condorcet methods]] |
[[Category:Smith-efficient Condorcet methods]] |