<div dir="auto"> James,<div dir="auto"><br></div><div dir="auto"> you are absolutely right ... as I stated it the method is basically just Implicit Approval ... definitely not Condorcet efficient.<div dir="auto"><br></div><div dir="auto">I intended to say each candidate ranked above or pairwise beating a' gets a point, and two points for both.</div><div dir="auto"><br></div><div dir="auto">The monotonicity proof goes through unchanged.... as z goes down, y gains a point, but so does X as it goes up.</div><div dir="auto"><br></div><div dir="auto">Thanks for taking the time to check this out!</div><div dir="auto"><br></div><div dir="auto">Forest</div></div></div><br><div class="gmail_quote"><div dir="ltr" class="gmail_attr">El mié., 6 de abr. de 2022 6:55 a. m., James Faran <<a href="mailto:jjfaran@buffalo.edu">jjfaran@buffalo.edu</a>> escribió:<br></div><blockquote class="gmail_quote" style="margin:0 0 0 .8ex;border-left:1px #ccc solid;padding-left:1ex">
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I may not understand the method, but consider the following with candidates X, Y, Z:</div>
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51 X<Y<Z</div>
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49 Y>Z>X</div>
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Then X is the CW, and X is ranked over or pairwise defeats a'(B) only on those ballots B in the group of 51. Thus N(X)=51.</div>
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Meanwhile, Y is ranked over a'(B) on all ballots, so N(Y)=100.</div>
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If I've understood the method correctly, it is not Condorcet efficient.</div>
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Jim Faran<br>
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<div id="m_-8769659855404349338divRplyFwdMsg" dir="ltr"><font face="Calibri, sans-serif" style="font-size:11pt" color="#000000"><b>From:</b> Election-Methods <<a href="mailto:election-methods-bounces@lists.electorama.com" target="_blank" rel="noreferrer">election-methods-bounces@lists.electorama.com</a>> on behalf of Forest Simmons <<a href="mailto:forest.simmons21@gmail.com" target="_blank" rel="noreferrer">forest.simmons21@gmail.com</a>><br>
<b>Sent:</b> Wednesday, April 6, 2022 2:57 AM<br>
<b>To:</b> EM <<a href="mailto:Election-methods@lists.electorama.com" target="_blank" rel="noreferrer">Election-methods@lists.electorama.com</a>>; Kristofer Munsterhjelm <<a href="mailto:km_elmet@t-online.de" target="_blank" rel="noreferrer">km_elmet@t-online.de</a>><br>
<b>Subject:</b> [EM] Decloned Copeland Borda Hybrid</font>
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<div dir="auto">On each ballot B identify the anti-favorite a'(B) as the candidate a' among those bottom listed on ballot B that is bottom listed the most on the rest of the ballots.
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<div dir="auto">[A candidate is bottom listed on a ballot if it is ranked over no candidate on that ballot]<br>
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<div dir="auto">Elect the candidate X that, on the most ballots B, either is ranked ahead of or pairwise defeats a'(B).</div>
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<div dir="auto">In other words, elect argmax N(X), where N(X) is the cardinality of the set of ballots</div>
<div dir="auto">{B | X is ranked ahead of or pairwise defeats a'(B) (or both)}.</div>
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<div dir="auto">The key to monotonicity is that if some candidate X is uniquely raised on some ballot B, then for any other candidate Y, the difference N(X)-N(Y) does not decrease.</div>
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<div dir="auto">The only non-trivial case is where X starts in the a'(B) position and swaps positions with some Z that was ranked above it. </div>
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<div dir="auto">This definitely adds a point to N(X) because X is newly ranked ahead of a'(B). This will also add a point to Y if Z is pairwise defeated by Y.</div>
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<div dir="auto">In any case, N(X)-N(Y) does not decrease.</div>
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<div dir="auto"> Does this method satisfy the Condorcet Criterion?</div>
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<div dir="auto">Well, if X pairwise defeats all other candidates, then N(X) is equal to the total number of ballots minus the number of ballots on which X is in the a' position, which must be fewer than half of the ballots, otherwise X would be the Condorcet
loser.</div>
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<div dir="auto">Is it possible for N(Y) to be greater than this N(X) while losing pairwise to the CW X?</div>
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<div dir="auto">Perhaps ... if so, then this method is not a stand alone Condorcet method.</div>
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<div dir="auto">It would be a valuable task for someone to test its Condorcet efficiency experimentally.</div>
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<div dir="auto">Thanks!</div>
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<div dir="auto">-Forest</div>
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