Information for "Category:Sequential comparison Condorcet methods"

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Display titleCategory:Sequential comparison Condorcet methods
Default sort keySequential comparison Condorcet methods
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Page creatorBetterVotingAdvocacy (talk | contribs)
Date of page creation16:44, 21 February 2020
Latest editorBetterVotingAdvocacy (talk | contribs)
Date of latest edit11:06, 19 April 2020
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The Robert's Rules of Order pairwise elimination method is a prominent example of a sequential comparison method. Sequential comparison methods can all be described in the following manner: "order all candidates from first to last, eliminate the pairwise loser between the first two candidates in the order, and repeat until there is only one candidate remaining." All sequential comparison methods are Smith-efficient and thus Condorcet methods, because at least one Smith set member will remain uneliminated after each and every pairwise comparison (since a Smith member can't lose a matchup against a non-Smith member, and a matchup between two Smith members always leaves one Smith member uneliminated). These methods can also be called "Sequential pairwise" methods or any number of other names reflecting that they are based on eliminating the loser of a runoff.
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