Talk:Electoral system/Archive 6

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The Favorite Betrayal Criterion, more than any other, directly indicates whether an election system provides perverse tactical incentives to vote dishonestly. Ranking another candidate ahead of your honest favorite is perhaps the surest way to guarantee that the final tallies do not reflect the honest opinions of voters. We should make it easy for people to see which election systems encourage doing so, and which do not. As such, I propose rearranging the table of criteria to put the favorite betrayal criterion in the first column. What do you think? —Qaanol (talk) 23:40, 29 December 2012 (UTC)

All right, with no objections, I have gone ahead and made the change. I also made the entry for Range Voting in the Majority Criterion column match the entry for Approval Voting in that same column, because those two election systems behavior the same with regard to that criterion. Namely, a majority bloc of voters with the same favorite candidate, can guarantee that candidate wins if they know they are part of such a majority (as, for instance, pre-election polls could tell them.) And I fixed a different cell that had no text and an invisible border. —Qaanol (talk) 04:20, 1 January 2013 (UTC)

Um.

These edits are clearly good-faith, and probably point the way towards improvements. But as they stand, I oppose them, and I'd ask you to revert so we can take this a little slower. One at a time:

1. FBC at front

Personally, I agree that FBC is one of the most-important criteria, and I'm happy to have it at the front. However, it scarcely even exists in the literature, and the FBC article has been deleted more than once. So I think your move is controversial. Moreover, it breaks the division of the criteria into categories, as shown in the previous section explaining the criteria meanings. So for both of those reasons, I appreciate your WP:BOLD action, but I think it needs further discussion.

2. Range/Score voting and the majority criterion: While you are correct that Range meets the Majority criterion if the majority votes strategically, just as approval does, that is not what "rated" means here. The "rated" majority criterion simply states: "If a candidate is the only one to recieve the highest rating/ranking on a majority of ballots, that candidate wins". This criteria is not met by range: 2 ballots that vote X100 Y99 can be overcome by one ballot that votes X0 Y100, and X will lose. (Yes, the foregoing votes are not strategic. However, that issue is covered in the "strategic, majority Condorcet" column, which Range already ranked as passing.)

I will not be around for the next week or so, but I'm reverting your changes. Please discuss this further. If you want someone to argue with while I'm gone, you might have luck by pinging MarkusSchulze or anybody else you see participating above on this talk page. Homunq (࿓) 12:07, 1 January 2013 (UTC)

Thanks for the info, I did not realize the FBC was rare in literature. I would have expected it to be well documented and supported, because it seems one of the most important criteria. After all, if an election system encourages insincere votes, then it does not matter how fancy the tallying method is, because garbage in, garbage out. In any case, I'll leave your version in until we get further discussion. —Qaanol (talk) 05:59, 2 January 2013 (UTC)

You should read the literature on what happens with sincere and insincere voting in practice. For example, IRV violates favorite betrayal, but I don't know of any real-life examples of it affecting how people vote despite so many IRV elections to example. On the other hand, violation of later-no-harm absolutely leads to truncation of rankings (Bucklin) or approvals (approval voitng) in the handful of places that have tried system that violate it... My theory is that a lot of voting methods folks are better at understanding math than human psychology.RRichie (talk) 18:34, 3 January 2013 (UTC)

Miller (1987) cited in Hillinger (2004): "…Historically, economists have contributed at least as much as political scientists to the pure theory of voting. The theory of voting has its origins in the work of such enlightenment philosophers and mathematicians as Borda, Condorcet and Laplace. Little further progress was made until some forty years ago when the economist Duncan Black wrote a series of articles (most notably Black, 1948) on the logic of committees and elections, which were subsequently consolidated into a book (Black, 1958). Since Black revived the subject, a number of economists and political scientists have made important contributions. Indeed, the theory of voting has to some extent been subsumed by the more recent and abstract theory of social choice, which was virtually invented by the economist Kenneth Arrow (1951)."

Would make a great citation for the history section. Also, we should definitely be mentioning Black. Homunq (࿓) 13:33, 1 January 2013 (UTC)

~Q: Is there a citation for "Strategic Condorcet"?

~Q: Are there citations for how to apply this criterion, which involves various hypothetical conditions and suppositions (i.e. predicting game theory outcomes), to each of the voting methods?

~Q: I wonder, if IRV voters have perfect information, how can we be sure that the "Push Over" effect would not be avoided, by voters compromise voting and hence correctly revealing the Condorcet winner, just as approval voters may compromise vote based on predicting how other might vote?

The problem I see raised by the last question, is that it places the determination into the realm of qualitative, if you will, rather than mathematical compliance terms.

I am sympathetic to those who want to show Approvals strong theoretical Condorcet performance under Nash Equilibrium etc., however I am very concerned that inventing a criterion is not the best way to express this strength.

Even so, I'm not sure that on the general voting page, where we have so many criteria that we should open up the possibility of criteria performance under various hypothetical conditions.

I strongly suggest that we include only mathematical compliance criteria, not hypothetical conditions.

At minimum, I would request that this criterion and Condorcet performance of Approval voting be moved to the Approval Voting page, a worthy topic, until it has been better vetted or given citations.

Filingpro (talk) 01:48, 20 May 2013 (UTC)

Q1: Is there a citation for supposedly “passing” Independence of Irrelevant Alternatives by rating methods such as Approval in the compliance table?

Q2:

GIVEN: In plurality voting if A is elected over B in a two-candidate race, then adding spoiler C to the ballot can split votes for A, by some voters changing their ballots from A to C, causing B to win (hence violating IIA).

As with the example above, how is it not the case that in an approval voting where A is elected over B in a two-candidate race, then adding spoiler C to the ballot can split votes for A, by some voters changing their ballots from A to C ("bullet voting"), causing B to win (hence violating IIA)?

Filingpro (talk) 01:44, 23 May 2013 (UTC)

Q: In the compliance chart under "Strategic Majority Condorcet", where are the citations or argumentation for each of the method's stated compliance, except for Approval?

Q: If all voters have perfect information about other voters preferences and vote strategically, and it is assumed voter preference listings will not be truncated (i.e. guaranteed majority participation as stated in the "criterion"), then does IRV satisfy Condorcet, Participation, Monotonicity, and IIA?

EXAMPLE 1

Consider how the Condorcet winner is lost in IRV due to the "Push Over" candidate advancing to the final round, while the Condorcet winner suffers from early elimination:

Voter preferences (sincere):

28: R > C

5: R > L

30: L > C

5: L > R

16: C > L

16: C > R

In IRV, L wins but C is Condorcet winner. But if the voters have perfect information about preferences and vote strategically, then "R > C" will compromise vote, and choose "C > R", electing C the Condorcet winner. Simply put, those who are voting for the "Push Over" candidate ("R") and prefer the Condorcet winner over the other alternates, just vote for the Condorcet Winner first instead, an obvious strategy in their interest, because the "Push Over" candidate has no chance of winning no matter what rational strategies any coalition might attempt. This is akin to Approval voting always electing a Condorcet winner when voters compromise vote with perfect strategy.

Note importantly in the above example there is no game of "chicken" - i.e. a situation where one coalition can gain from playing a non-cooperative hand, taking advantage of another who plays a cooperative hand. There is no such unstable situation which deters the voting method from electing the best cooperative candidate C, the Condorcet winner.

For example, consider each of the other coalitions, none of which have a rational strategy leading to advantage:

- Voters "R > L" can do nothing further to change the winner from L to R, since R is defeated head-to-head by both L and C, while R is already maximized on the ballot.

- Voters "L > ?" have no interest in changing the winner from L. There is also no rational winnable counter-strategy against the other voter's who avoid voting for the push over candidate R. If "L > ?" voters assume "R > C" does not vote strategically, then there is no strategic response necessary. If "L > ?" voters assume "R > C" voters do vote strategically (i.e. switch "C > R") then they are powerless to defeat C with a whopping majority rule (In fact, Monotonicity violations are most likely impossible under "strategic" IRV voting, at minimum for this example).

- Voters "C > ?" are in a position of strength because they support the candidate who beats all other candidates according to voters' sincere preferences. Therefore holding their first choice "C" will necessarily force "R > C" voters to support C first because it is in their interest. Meanwhile "R > C" voters know that "C > R" voters wont change to R first, because there is no strategic advantage. (It is also noteworthy that if "R > C" voters logically vote "C > R" having perfect information, then IRV passes Participation criterion.)

EXAMPLE 2

Consider another IRV example (unrelated to Monotonicity and Participation issues), when IRV eliminates a Condorcet winner prematurely, one having weaker plurality strength:

49: L > C

48: R > C

2: C > L

1: C > R

NOTE: for this example it is important to note that the measure for passing the "Strategic Majority Condorcet" assumes there are no ties in the strategy equilibrium - we are allowed to consider only "For a large electorate, if there is an equilibrium with no tie" (see the citation for approval voting's determination http://halshs.archives-ouvertes.fr/docs/00/12/17/51/PDF/stratapproval4.pdf). In other words, R's enthusiastic supporters have perfect information that L will defeat them in a head-to-head race, despite how close the race might be.

L is the IRV winner but C is the Condorcet winner. But if the voters have perfect information about preferences and vote strategically, then "R > C" will compromise vote, and choose "C > R", electing C the Condorcet winner. Simply put, those who are voting for the "Push Over" candidate ("R") and prefer the Condorcet winner over the other alternates, just vote for the Condorcet Winner first instead, an obvious strategy in their interest, because the "Push Over" candidate has no chance of winning no matter what rational strategies any coalition might attempt. Once again, this is akin to Approval voting always electing a Condorcet winner when voters compromise vote with perfect strategy.

These examples raise several important questions:

1. Where are the citations and determinations for "Strategic Majority Condorcet" coming from? Are they correct? IRV appears to pass but "No" is put in the table.
2. There is no citation in the literature for proposing this as a mathematical criterion, only a theorem and proof of how approval elects Condorcet under perfect strategy conditions.
3. If we are allowed, as editor's to invent criterion to show how certain systems perform better, then should we not also add "Strategic Majority Participation" for which IRV passes, and also "Strategic Majority Monotonicity" for which IRV passes?
4. The idea of how voting systems perform under strategy is a very worthy topic, but shouldn't there be an entire section on voting under strategy? Given we don't have citations in the literature for the various systems under "strategic" criteria, nor citations for the criteria, it seems highly problematic to list this as a criterion in the "Comparison" table, rather than discuss them in essay form.

PROPOSAL:

1) we eliminate "Strategic Majority" criteria from the table because the criterion is WP:OR and the determinations for important voting systems are WP:OR

2) we put the comments either under footnotes for "Condorcet", or some other section about how voting systems respond to strategy (i.e. how compliance might change), or probably best if it goes into the approval voting page since this is a particular theorem about approval, not a criterion

Otherwise, we would have to put blank white in the determinations for all the voting systems that don't have a citation. Likewise, any editors could invent other criteria like "Strategic Participation", "Strategic Monotonicity" for which IRV passes.

And finally, once again, I am EXTREMELY concerned that on the one hand we have added (or allowed) an entire compliance criterion for which the application to approval is mathematically derived from a model of voter's strict ordinal preferences, in order to present approval favorably. On the other hand, same editors claim that we can not apply Later-No-Harm to approval using voter's strict ordinal preferences, which portrays approval unfavorably.

To see how approval's mathematical determination for "Strategic Condorcet" is derived from voters strict ordinal preferences, please read the source provided http://halshs.archives-ouvertes.fr/docs/00/12/17/51/PDF/stratapproval4.pdf, see the section under "Model", which reads "...it turns out that the obtained results can all be phrased in terms of preferences. That is: It will be proven that rational behavior in the considered situation only depends on preferences." It is not surprising that the correct mathematical model of the subject matter at hand must include the voters preferences as part of the model, otherwise the results would be useless.

Filingpro (talk) 01:16, 27 May 2013 (UTC)

Thanks for a thoughtful discussion, Filingpro. While I think that the "strategic majority" criterion is significant, and as you note we do have a valid citation for Approval in this regard, I am forced to acknowledge that you're right; we don't have citations for other systems, so the majority of this column is OR. The column should be removed, and discussion of this issue should be moved to approval voting.

I apologize that this is the first time someone has noticed your valid complaints on this issue.

As for IIA (above talk section): I'm pretty sure I can find a citation for at least Range voting, and one which uses the "no changing ballots allowed" definition of the criterion which MJ trivially passes. I'll look around a bit. Please do not remove the column in the meantime. Homunq (࿓) 15:12, 27 May 2013 (UTC)

Obviously, the example involving IRV is OR and not usable on the page. However, I think you're right: a majority condorcet winner is always the unique strong Nash equilibrium for IRV. Still, I believe you could construct cases where there is a non-majority Condorcet winner (ie, some voters are indifferent between that winner and some other candidate) and yet that candidate is not a strong Nash equilibrium winner for IRV. For Range and MJ, on the other hand, that non-majority CW candidate will still always be a strong Nash equilibrium winner, just not a unique one. This is a giant pile of OR and so if you want to discuss it further, we should probably take it to my talk page (or even email; you can use "email this user" for me and I'll respond.)

ps. the criteria as currently on the page reads (strategic (majority Condorcet)), not ((strategic majority) Condorcet). As you correctly point out, IRV passes that; but my claim here is that you could define a "((non-unique strategic) Condorcet)" criterion which would be passed by Range and MJ but not by IRV. I repeat though, it's a buncha WP:OR, so I don't plan to put anything like that on the page. Homunq (࿓) 15:31, 27 May 2013 (UTC)

Thank you, Homunq. Yes I do think the performance of these voting systems under strategy is very important to understand and yes I am very interested in the distinction you make regarding how they perform differently considering when voters are indifferent, and whether equilibrium winner must be unique. On a cursory level, when I poked around with approval and the Nash equilibrium concept, I found the most likely scenarios for failure involved some voter indifference, close ties, or incomplete voter preference rankings prior to translation to the approval ballot, although I cannot be sure a failure was found. So yes, I am quite interested in exploring this topic further.

I would like to defer to you first for the edits, because I think you have more familiarity with regard to the evolution of this column and its various footnotes, so that you are probably more qualified to surgically remove it while still respecting contributions from past edits etc. However, if you would rather defer this to me I will rise to the occasion.

One possible suggestion is I notice there is a duplicate, general footnote that now appears in many of the compliance for the systems under Condorcet criterion, something like “Condorcet…is incompatible with…etc. etc.”. Since this comment has no specific wording for a particular method – but to all those that fail, I wonder if we could put it in the rollover for the criterion itself. For example, it might be useful for the reader to be able to scan the top of the table and see how the different criteria are incompatible with each other. This frees up the footnote for adding the specific strategy performance citations for specific voting systems such as approval in approval’s box.

Filingpro (talk) 19:15, 27 May 2013 (UTC)

The summary table does not contain a line about Cumulative Voting. Can someone please add it? Thanks for all the hard work! --Erel Segal (talk) 14:42, 13 September 2013 (UTC)

Additionally, the text here says that "It is considered a proportional system in allowing a united coalition representing a m/(n+1) fraction of the voters to be guaranteed to elect m seats of an n-seat election", but, this is not compatible to the text in Cumulative Voting. Can someone please explain, how Cumulative Voting allows a coalition representing a m/(n+1) fraction of the voters to guarantee m seats of an n-seat election? --Erel Segal (talk) 18:58, 14 September 2013 (UTC)

In Woodall's Later-No-Harm, if b is a “later preference” than a, then a>b, given.

The objection to applying Later-No-Harm to Approval is really an objection to applying ordinals to Approval in general.

But ordinals do apply to Approval because a>b can be approvals ab, a, or none, axiomatically. So what’s the objection? I think objectors, if there are any, have an obligation to explain.

Note1: Saying LNH requires a “later” preference on an Approval ballot is a false premise, because Woodall doesn’t use an Approval ballot, he uses ordinals. We have to explain why ordinals can’t be applied which violates what is axiomatic.

Note2: Saying we need a citation would be disingenuous because taking what is given and applying an axiom requires no citation. For example, given the numbers 1 and 2, we don’t need a wiki citation to state 1 + 2 = 3 by axioms of addition. This is not WIKI SYNTH .

I realize this has already been discussed and a compromise agreed to, but I believe we overlooked the definitions in Woodall's document which explicitly refer to the voter's preferences, not the literal markings on an Approval ballot. Thanks for everyone’s consideration.

Filingpro (talk) 21:28, 11 October 2013 (UTC)

Yes, it has been discussed, and a compromise was reached. No, I don't think your argument here is anything new relative to that discussion. Please, let it lie, or at least find a sock puppet or something. (joke) Homunq (࿓) 00:14, 27 October 2013 (UTC)

The article currently reads:

"Independence of Irrelevant Alternatives (IIA)— Does the outcome never change if a non-winning candidate is added or removed (assuming votes regarding the other candidates are unchanged)?[4] For instance, plurality rule fails IIA; adding a candidate X can cause the winner to change from W to Y even though Y receives no more votes than before."

The problem I see: We changed some votes from W to X

In IIA, if we stipulate that the markings on the ballots for the other candidates cannot change when we add or remove an irrelevant candidate, then Plurality would pass IIA but it does not, which leads to a contradiction.

CASE 1:

A 51

B 49

A Plurality winner

If we introduce candidate X preferred by A voters which is irrelevant to the race between A and B, then no A voters can change their vote to X without withdrawing their votes for A. If we can not change votes for A we can not change the winner from A to B.

CASE 2:

X 3 (Voters prefer X > A > B)

A 48

B 49

B Plurality winner

If we remove candidate X from the election which is irrelevant to the race between A and B, then no former X voters can change their votes from X to A without changing their votes for A. If we can not add votes for A we can not change the winner from B to A.

This is incidentally why all non-dictatorial and Pareto efficient voting systems including Plurality, Approval, and Range fail IIA, because ballot markings may change when a candidate is added or removed based on the voter cutoff model assumed, while voters' ordinal and relative weighted preferences stay the same.

For example, in Approval voting, if all voters prefer X > A > B and approve only X, but then X is removed, then all voters prefer A > B so A must win to satisfy Pareto Efficiency, but the criterion is failed unless at least one voter can approve A.

Approval dictatorship:

999999 X (Voters prefer X > A > B)

1 B

Remove X from the election. If we adopt a mathematical model such that the approval cutoff for X voters can not change, then the B voter is the dictator.

Filingpro (talk) 08:24, 27 October 2013 (UTC)

Why was the Condorcet-IRV method removed from the article? Wat 20 16:03, 11 November 2013 (UTC)

I found another voting system which I think complies with the Condorcet Criterion and is designed to also comply with the two criteria mentioned above, Favorite Betrayal and Chicken Dilemma. I don't see it mentioned on Wikipedia, so maybe somebody should add a page for it and analyze whether or not it meets the criteria in the table on this page.

http://wiki.electorama.com/wiki/Symmetrical_ICT

Myrkron (talk) 21:03, 5 November 2013 (UTC)

Again, those are not widely accepted criteria. Markus Schulze 08:30, 6 November 2013 (UTC)

^{[citation needed]} Qaanol (talk) 02:47, 2 February 2014 (UTC)

When researching voting systems on the web, I've come across two more interesting criteria. Are they excluded on purpose?

Favorite Betrayal: If the winner is a candidate who is top-voted by you, then moving an additional candidate to top on your ballot shouldn't change the winner to a candidate who is not then top-voted by you.

Chicken Dilemma: http://wiki.electorama.com/wiki/Symmetrical_ICT Basically, you shouldn't be able to make your first choice win by rearranging your lower choices.

Myrkron (talk) 21:04, 5 November 2013 (UTC)

Those are not widely accepted criteria. Markus Schulze 08:30, 6 November 2013 (UTC)

Not excluded on purpose, but they appeared only recently, and long after the voting system article was created. But I would point out that these criteria are very similar to IIA and are all incompatible with Condorcet criterion. Wat 20 02:34 12 November 2013 (UTC)

The favorite-betrayal criterion has certainly been known for many years. It had a Wikipedia article which seems to have been deleted just last summer. Here is the most recent Wayback Machine snapshot of it, from June, 2013.

Moreover, this very Voting Systems page had the favorite-betrayal criterion included in its table of compliance for nearly all of the last two years, from January, 2012, through October, 2013.

Additionally, and I know this is not at all scientific, a Google search for ("favorite betrayal criterion" -site:wikipedia.org) yields 45,300 results, while ("reversal symmetry criterion" -site:wikipedia.org) yields only 2,360. That is over 18 times more non-Wikipedia hits for favorite betrayal criterion than reversal symmetry criterion.

So I propose we reintroduce FBC into the discussion and table of voting system compliance. Qaanol (talk) 01:27, 2 February 2014 (UTC)

For "favorite betrayal criterion", there are no hits in Google Books. And there are only 4 hits from 3 different authors in Google Scholar. Markus Schulze 15:08, 2 February 2014 (UTC)

Just as a note on books: "Gaming the Vote" by William Poundstone does mention the FBC, but it calls it a "property", not a "criterion". Homunq (࿓) 20:38, 20 March 2014 (UTC)

I changed a few citations formats, and replaced the shortened citations with the full citations. I also used named references to make those changes. This is the link to my sandbox. https://en.wikipedia.org/wiki/User:Lisax31/sandbox1 I am looking forward to your suggestions and feedbacks. Thanks! Lisax31 (talk) 04:13, 7 March 2014 (UTC)

Unrelated topic: I deleted the section that I myself created. I did this after I realized that what I said did not make sense. Sorry - oops - Boyd Reimer (talk) 16:50, 22 March 2014 (UTC)

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The favorite betrayal criterion page has been deleted in accordance with Wikipedia policy; that deletion is now undergoing a review. Your comments are welcome. Homunq (࿓) 14:33, 14 April 2014 (UTC)

I'm not going to do this right now, as it would probably be disruptive to the above RfC. However, as soon as that's done with, I think that the criteria and table should be put in their own separate article, transcluded here. That would simplify and separate the discussion; after all, there have already been attempts to effectively give the table its own talk page, but I think that without splitting it out as a sub-article, such attempts are doomed to fail. Homunq (࿓) 16:10, 20 April 2014 (UTC)

Now that the RFC is done, what do people think of this idea? I don't want to do it without some discussion first. Homunq (࿓) 14:59, 15 May 2014 (UTC)

Below are the problems I see with Cardinal Voting: The Way to Escape the Social Choice Impossibility by Sergei Vasiljev:

1. Assumes voter preferences A:87, B56, C:13 on an approval ballot AB means voter’s cardinal and ordinal preferences are A=B (contradiction).

2. Proves non-dictatorship by assuming a voter can approve candidate A to offset the dictator who approves B, but contradicts by assuming same voter cannot approve A in order to satisfy IIA.

Is there a consensus yet among theorists and how can we know to use this article? Is see no affiliations. Saying all cardinal methods pass Arrow's Impossibility seems like a fantastical claim, given that voters having cardinal weights only adds information to the voter model but does not subtract ordinal information from the voter model.

Filingpro (talk) 09:04, 27 October 2013 (UTC)

They all "pass" because Arrow's Impossibility theorem applies to preferential voting systems only. It doesn't mean however that cardinal voting should be preferred over preferential voting. Claiming that is like claiming that dictatorship is to be preferred over non-dictatorship. Dictatorship is the easiest way to satisfy IIA. Wat 20 01:32, 13 November 2013 (UTC)

Cardinal models that are dictatorial don't pass Arrow's Impossibility. The point is Vasiljev claims a cardinal model for which all Arrow's criterion are in fact interpreted, applied and pass, but the logic seems to me to have errors. This is why I am asking editors if we can find a better source or if there is any consensus yet in the field. I do not understand the idea that cardinal voting models are not preferential when a voter's cardinal preferences A:87, B:56, C:13 implies A>B>C axiomatically. It seems logically they can not be exempt from preferential theorems.

I see your point and we agree that in order to pass IIA we must adopt a dictatorial model for cardinals, but that doesn't make sense to me to adopt such a model, for say, approval voting, which is not inherently dictatorial. Approval voting only stipulates to vote for any number of candidates. Only by imposing a particular cutoff regime we make it dictatorial. That's why, I am quite confident, Approval voting fails IIA. Approval voting is a preferential system because the voter may express or disguise preferences arbitrarily.

Filingpro (talk) 01:03, 15 November 2013 (UTC)

The reason (most) cardinal systems can be said to "pass" all of Arrow's "incompatible" criteria is that in such systems, erasing a candidate from a ballot does not affect the others. However, doing so can leave an obviously-unstrategic ballot; for instance, an approval ballot that approves all or none, or a score ballot that rates the only two options at 36 and 37 instead of 0 and 100. Arrow's theorem does not account for the possibility of such "strategically incompetent"/"non-admissible"/"watered-down" ballots; it assumes that A>B is always just A>B, not A>>>B or A(>)B.

As soon as you take (competent) strategy into account, you are back in the realm of irresolvable dilemmas (as Gibbard and Satterthwaite proved). Homunq (࿓) 20:54, 20 March 2014 (UTC)

If voters cannot decide their approval cutoff based on the alternatives in the election, the voting system is dictatorial. Because Approval voting is not dictatorial (i.e. voters may vote for at least their most preferred candidate), Approval voting fails IIA. No voting system passes all of Arrow's criterion as long as you assume voters have preferences.

Arrow's theorem did not fail to account for cardinal preference because he proves a stronger theorem, for ordinal preferences.

My original question is whether we are basing the IIA passage on Vasiljev's publication which I am concerned is not a recognized source, and for which I have pointed out the errors (please see my point #2 in the original posting). Arrow won the Nobel Prize and is peer reviewed.

Filingpro (talk) 23:15, 19 May 2014 (UTC)

The article asserts: "Majority judgment meets a related, weaker criterion: ranking an additional candidate below the median grade (rather than your own grade) of your favorite candidate, cannot harm your favorite."

Counterexample: 6 voters

1: A=”Excellent”, B=”Fair”, C=”Poor”
1: A=”Excellent”, B=”Poor”, C=”Poor”
2: B=”Excellent”, A=”Fair”, C=”Poor”
2: C=”Excellent”, A=”Good”, B=”Good”

Candidate Ratings
A: “Excellent, Excellent, Good, Good, Fair, Fair”
B: “Excellent, Excellent, Good, Good, Fair, Poor”
C: “Excellent, Excellent, Poor, Poor, Poor, Poor”

NOTE: B strong supporters harm themselves by rating A “Fair”, despite being below B’s median grade “Good”.

I will wait for anyone to point out an error with the counterexample before updating the article appropriately.
Filingpro (talk) 08:56, 21 May 2014 (UTC)

1. This counterexample is not well-stated, but you are correct that it points to a true counterexample for Majority Judgment. Later-no-harm is an individual, not a collective, criterion, so you must change your ballots so that 1 of the B voters has already strategized in order to get a counterexample for the other B voter. In general, counterexamples only exist when (among other requirements) the pivotal voter is the only one to give the relevant candidate a certain grade. In a large election, that is asymptotically never.

2. The footnote itself is based on Balinski, M., and R. Laraki. “A Theory of Measuring, Electing, and Ranking.” Proceedings of the National Academy of Sciences 104, no. 21 (2007): 8720, in which they show that the stated qualification applies to "order functions" including the median, but do not address the Majority Judgment tiebreaker procedure. Since I myself usually focus on median systems for which the footnote would be true¹, I didn't realize that Balinski and Laraki were pulling a bit of a fast one here.

3. I still believe that something qualification of the current footnote is appropriate and supported by sources. I'll try to edit it so it does not misstate the facts.

¹Such procedures include: Graduated Majority Judgment, in which median ratings are linearly interpolated between the grade transitions; Majority Approval Voting, which breaks ties by number of above-median votes; ER-Bucklin, which breaks them by number of median-or-above votes; Majority Choice Approval, another name for ER-Bucklin with only 3 grades; Continuous Median, in which grades are set on a continuous scale using a slider, and so no tiebreaker is needed; and Bucklin-Condorcet, in which a Condorcet matrix is built from the top grades down until some candidate has a majority. Of all of these numerous median procedures, MJ is the only one where a counterexample like yours works. I realize that all of that is WP:OR; but then, so is your counterexample. I think it's OK to discuss original findings here on talk (for instance, I'm grateful for your counterexample), as long as they're not the basis for claims on the page. Homunq (࿓) 12:21, 21 May 2014 (UTC)

OK. Good but the footnote is confusing "Median systems like MJ meet a weaker criterion..." this means or at minimum implies MJ meets the weaker criterion. Can we fix that? I'll put in a hack for now but please smooth it out. Thanks.

Filingpro (talk) 07:48, 22 May 2014 (UTC)

Re: Homunq edit to the posting

1. 1

I object to the word "voluntary" when the voter abstains in an election due to an immovable approval cutoff being imposed on the voter by the mathematical model.

The reason is that the voter does not choose the alternatives in the election, and so does not choose whether they will vote in any particular election (i.e. they have no control over whether they vote or not). Whether or not they can vote is determined by factors completely external to the choices available in the election.

When we stipulate a model of the voter using an absolute cutoff, we have invented a creature for which we can not ascertain the motives unless we artificially ascribe them - i.e. in my posting I am not describing an "expressive" voter who "volunteers" to abstain. I am merely saying if Approval passes IIA, the cutoff must be absolute, and if so we can only conclude that a voter must necessarily abstain in certain elections, not whether the voter does so voluntarily.

Likewise I object to the edit re: voters "foregoing their voting power". If the absolute cutoff is computed prior to knowing any available candidates, the voter has no power to exercise or forego in the election.

The real issue is that Approval voting fails IIA, both in the real world of course, and also it fails mathematically because any non-dictatorial cutoff model fails. It is only when we choose to adopt a dictatorial cutoff model that we can claim it passes IIA, which I don't see why this model would be chosen. We would have to add "Non-dictatorship" criterion to the table, showing Approval's failure. But Approval voting is not a dictatorship. It merely says "Vote for any number of available alternatives."

1. 2

I object to broadening the final statement, in this context, to saying all voting systems fail IIA. We are not talking about all voting systems here. We are talking about rating methods and whether they pass or fail.

I do support adding the comment regarding how all deterministic, candidate-neutral methods fail IIA, but this valuable comment belongs in a section of the article that addresses IIA in general. If no non-dictatorial systems pass IIA, then IIA compliance under the rating methods shouldn't say 'Yes'. To me, this looks like an obvious error on Wikipedia. We know this because of Arrow's renowned work for any voter preference aggregation system.

I will allow for comments before reverting the edit by Homunq
Filingpro (talk) 18:21, 20 May 2014 (UTC)

We can either fight over this, or find a compromise everyone can live with. If it's the former, the truth doesn't matter; only what we can WP:CITE — and citations seem as absent from your argument above as from your edits to the page. In other words, if either one of us tries to WP:OWN this or starts an WP:EDITWAR, I think we'll both lose.

Since I prefer it when the truth matters, I'd rather take things in the spirit of compromise. I didn't revert your edit, but rather tried to craft a compromise which would separate the baby from the bathwater. I'd appreciate it if you'd do the same with what I proposed.

So, to address your specific arguments:

1. 1: I'm not attached to the word "voluntary", but I don't think the word "dictatorial" has any place here either. Approval can pass IIA without any external force imposing a universal cutoff; it works just as well if every voter has an internally-motivated, voluntary cutoff. Both of those are mere words around the idea that the cutoff does not vary depending on the candidates available; let's just describe that as neutrally as possible.
2. 2: As Tonto said, "what do you mean, 'we'?" If an article about human life span said that "no Scot is immortal", it would be appropriate to edit that to say "no human is immortal"; needlessly over-qualifying a statement in this way is misleading.

I look forward to seeing your proposed text, and to working to find something that we, and everyone else who cares, can live with.

Homunq (࿓) 01:30, 21 May 2014 (UTC)

I removed "Dictatorship"

re (1) Let me clarify, the voter cutoff may be chosen by the voter, but when it must be computed independently of knowing the available candidates, then the voter's ability to vote in an election with two arbitrary candidates is random, the voter has no control over abstention.

re (2) I strongly disagree. The rhetorical method you employ is genius, [1. Approval passes IIA under certain assumptions] then, after softening these assumptions, you imply but do not say explicitly [2. By the way, these assumptions are reasonable because if we lift these assumptions then any method would fail IIA]. In other words, you turn it into a proof ad absurdum, that lifting these assumptions doesn't allow us to distinguish methods that pass or fail IIA (when the truth is, obviously, none of them pass). This obfuscates, in a brilliant way, the truth. Here is the truth: Passage of IIA by rating methods requires extreme, unrealistic assumptions. When they are lifted, they all fail IIA.

re edit war - I am not concerned - I take a long term view and I'm not likely to spend much time on this as I am working on a publication - feel free to improve my edit. I totally accept that we may have different and strong opinions. No problem. Thanks for working on the article. I have learned a lot by working on Wikipedia.

Filingpro (talk) 10:01, 21 May 2014 (UTC)

I edited the page again. I think we're coming closer to something we can agree on. As long as we don't do out-and-out reverts, I'm happy doing this through page edits alone; I think we understand each others' positions well enough to skip the talk page on this issue from here on. Homunq (࿓) 12:38, 21 May 2014 (UTC)

Excellent. I like "For this to hold, in some elections, some voters must use less than their full voting power or even effectively abstain, despite having meaningful preferences among the available alternatives."

• • • One important final objection: The reader has a right to know the minimum to fail IIA, otherwise we obscure the truth about the conditions of its failure.

Since we've gone back and forth on the last sentence, how about this: if you can provide reasoning or proof that failure IIA requires some voters to both put their favorite highest and and least favorite lowest, then we can put that in the article.

Meanwhile here is an example where a weaker minimum condition causes the IIA failure (actually its not a condition its a lack of restriction)...

Example - In Majority Judgement, abstaining from rating a candidate gives them the lowest rating. Assume ratings: Excellent, Good, Fair, Poor

3 voters prefer A>B>C vote A=Fair, B=Poor, C=Poor

2 voters prefer B>C>A vote B=Fair, C=Poor, A=Poor

2 voters prefer C>B>A vote C=Fair, B=Poor, A=Poor

BC coalition vote split, A wins, Condorcet winner tie BC lost

Remove C from the race. Hold another election. C supporters need only give any positive rating, e.g. "Fair", to their favorite candidate in the race (B), to make B the winner, failing IIA (changing the winner from A to B by removing and adding spoiler C from/to the race).

Rather than back and forth edit, here is what I propose, for the last sentence:

"If, on the contrary, it is assumed at least possible that any voter might give a minimally positive rating to their favorite candidate, these systems fail IIA."

Thanks if you can come up with something better.

Filingpro (talk) 18:53, 22 May 2014 (UTC)

Probably a bad idea to spend too much effort being precise in our OR. I'll make another simpler try. Homunq (࿓) 19:38, 22 May 2014 (UTC)

Article reads:"Majority judgment will not elect a majority Condorcet loser, but can elect a Condorcet loser if some voters are indifferent."

1. 1 Here is an example of MJ failure of Condorcet Loser, but I don't see any "indifferent" voters:

https://en.wikipedia.org/wiki/Condorcet_loser_criterion#Majority_Judgment

1. 2 What is a "majority Condorcet loser"? Where is that term defined? What is the proof, or reasoning? Is this WP:OR? How do we know this is relevant or correct?

To be clear, I am open to a qualified failure awarded, but I don't understand the explanation given. I am concerned because it seems clear the statement includes false claims. Thanks for any clarification.
Filingpro (talk) 02:25, 23 May 2014 (UTC)

You are correct. Homunq (࿓) 02:35, 23 May 2014 (UTC)

Article: "Approval only passes the majority criterion if the majority approve of only one candidate. Though this is strategically rational of them if they know each other's preferences, it may not be the obvious strategy if they do not."

Issue #1 1st sentence seems to be false

Here is an example where Approval passes majority without the majority approving only only candidate...

40 voters A>B>C approve A
30 voters A>B>C approve AB
25 voters B>A>C approve BA
5 voters B>A>C approve B

Majority preferred candidate A wins 95 approvals to B 60 approvals

Issue #2 "Though this is strategically rational of them..." I assume this sentence is the justification for its qualified failure? That is, as long as voters are strategically rational, it passes Majority?

The problem with this is what consistent standard do we apply for qualified failures and passage of criterion?

For example, Borda passes Majority if the Majority strategically votes only their preferred candidate.

Concerned also the same for Majority Judgement.

I see a contradiction because Approval and MJ fail Pareto Efficiency (if every voter prefers A, the voting system must elect A), yet they receive a qualified failure for Majority criterion. Meanwhile, Borda satisfies Pareto Efficiency, but isn't granted any privilege with respect to the Majority criterion.
Filingpro (talk) 21:43, 22 May 2014 (UTC)

We've had this discussion before. Approval passes the majority criterion, period. That is, if a majority vote candidate A above all other candidates, A wins. This is not true of Borda.

Obviously, it wouldn't be appropriate to give it a green, as we both understand, because this technical meaning of the majority criterion is not what most people, including you, think it means. Most people would think that preferences that are in your head but not on the ballot should count for something. But that's not how criteria are defined, so it would be equally inappropriate to completely give it a red.

The current wording is a compromise. If you think you can do better, go for it. Homunq (࿓) 22:21, 22 May 2014 (UTC)

Criterion are not defined by the ballot (ballots change), they're defined by the framework (i.e. mathematical model) used by the author. As editors, we read the terms and definitions of the author. For example, Woodall defines a voter ordinal model. He defines the literal 'ballot' to be a listing of voter's ordinal preferences, as might be cast in an election. You can not remove the voter's ordinal preferences from the model.

Since the statement in the article is false I will remove it.

Since the sentence about strategic voting doesn't seem to be the reason for the qualified failure (because then Borda will be qualified failure) I will remove it too.

Filingpro (talk) 01:19, 23 May 2014 (UTC)

I think you are just wrong here, but it's not worth fighting about. The statement is not vital to the article. Homunq (࿓) 02:36, 23 May 2014 (UTC)

[9] has a table like the one here... we should certainly use it as a reference when possible. Homunq (࿓) 12:59, 5 June 2014 (UTC)

@Homunq (or others)

Re: "rated" definition of Majority "candidate A voted above all others" vs. common definition "candidate A preferred by voters"

Why must we stipulate the strict voting above on the ballot, rather than the voters preferences?

None of the other global criteria (Condorect, Mutual Majority) do we do this. Of course, as we should, we consider the voters preference because they are the input to the voting system, and we wish to compare how voting systems respond differently to the same input.

Why is Majority different?

How can we justify applying the strict ballot markings (0, 1) as the basis for interpretation of preference for Majority, but not Condorcet and Mutual Majority? (Approval voting)
Filingpro (talk) 16:32, 27 July 2014 (UTC)

1 MJ receives qualified failure of Participation because voters may strategically change their ratings, based on information on how others will vote.

2 MJ receives qualified failure of Consistency assuming voters use absolute ratings (not strategic).

3 MJ receives qualified passage of IIA assuming voters use absolute ratings.

Which is it, strategic or absolute?

Are absolute ratings a viable model? Must a voter use the same ratings they mark in a closed party primary election, in the runoff election?

"Semi-honest" strategy requires the voter to lie strategically, giving candidates relative ratings they would not otherwise, i.e ratings they do not deserve. How does the voter know to do that? How does the voter know they will not harm themselves? Please see problem discussed above "What is our standard for qualified failure?"

Filingpro (talk) 07:42, 27 August 2014 (UTC)

Two colored "electoral system maps" of the world appear in the article at section 5.5 "Post-1980 developments". There appears to be no legend (A key to the symbols and color codes on a map, chart, etc.) to accompany the maps. In addition there is no date for the maps which is important as jurisdictions do change voting systems. Finally there is no apparent source or authority for the maps. In my opinion the maps are of little value without these 3 features but I have not deleted the maps in the hope that another user has the missing information to include in the article. Lanyon (talk) 07:46, 19 May 2015 (UTC)

On 13 May 2014, the Condorcet loser box for runoff voting was changed from "yes" to "no". I am surprised that such a blatant error wasn't corrected for more than a year. Markus Schulze 10:56, 17 September 2015 (UTC)

All voting systems pass Condorcet when voters have perfect information and vote strategically, because those who support the Condorcet Winner bullet vote for the Condorcet winner. (This has been discussed, illustrated by examples, and acknowledged in a more detailed discussion in the Archive).

Q: If they all pass Condorcet, including, for example IRV, why are there seemingly arbitrary qualified failures? What is our standard?

If we have a standard, I think we might consider that a method should not receive the benefit of a qualified failure when it fails the criterion under common circumstances under which another method without qualified failure (i.e. full failure) passes the criterion.

For example, current MJ is granted qualified failure and IRV full failure. But here is a common example of the "center squeeze" problem in voting that IRV handles elegantly, but Majority Judgement loses the Condorcet winner.

L = extreme left candidate CL = center left candidate R = right candidate

Ratings: "Excellent, Good, Fair, Poor"

40 left voters L>CL>R, vote L=Excellent, CL=Good, R=Poor
32 center left voters CL>L>R, vote CL=Excellent, L=Good, R=Poor
28 right voters R>CL>L, vote R=Excellent, CL=Fair, L=Poor

L tallies:40 Excellent, 32 Good, 28 Poor
CL tallies: 32 Excellent, 40 Good, 28 Fair
R tallies: 28 Excellent, 72 Poor

Majority Judgement count: Tie between L and CL with median "Good". Remove 21 "Good" ratings. L is closest-to-median winner "Excellent".

IRV elects the strong Condorcet winner CL. Majority Judgement elects extremist left candidate L.
Filingpro (talk) 22:54, 22 May 2014 (UTC)

The standard is, is there always a possible strong semi-honest equilibrium for a CW. This does not hold for IRV or Borda, but does hold for any system which can reduce to approval (including Range, MJ, Approval... and also things like Schulze and RP, though the latter pass the CC without needing this anyway.)

As for your example, it's even easier to find examples where honest IRV fails Condorcet and MJ doesn't. (Also, your example is a chicken dilemma, but not a center squeeze. IRV fails center squeeze; it means that the centrist has fewer partisans than either winger.) Homunq (࿓) 02:43, 23 May 2014 (UTC)

MJ can also fail "center squeeze" scenarios- e.g. change 4 center left (CL) voters above to right (R).Filingpro (talk) 21:17, 30 August 2014 (UTC)

I don't think its a Chicken Dilemma because L and CL can not cause R to win by withholding their support for each other. I believe its a straightforward case of loss of the Condorcet winner with sincere voting. Filingpro (talk) 21:17, 30 August 2014 (UTC)

sure understood center squeeze used differently that I do here - no problem

For our standard, why does the equilibrium have to be "semi-honest"?

Note: R supporters (above) cannot just promote CL to "Good" to improve the outcome, they have to lie and give CL "Excellent", the same rating as their favorite (R). The ballot markings could mean voter ordinal preferences R>CL or CL<R with 50% probability each. We wouldn't know the ordinal preferences. I can come up with cases, in IRV, of correcting a Condorcet winner by fewer ordinal reversals, hence a more honest profile of the voters sincere preferences.

Filingpro (talk) 03:37, 23 May 2014 (UTC)

The equilibrium I'm referring to is, in the case of your example:

40 left voters vote L=Excellent, CL=Good, R=Poor

21 (or more) center left vote CL=Excellent, L=Poor, R=Poor

11 (or fewer) center left voters vote CL=Excellent, L=Good, R=Poor

28 right voters R>CL>L, vote R=Excellent, CL=Fair, L=Poor

Note that even if only 11 of the CL voters truncate L, this result is already nearly assured; though it's not, strictly speaking, a strong Nash equilibrium until there are 21 such votes.

Homunq (࿓) 18:28, 23 May 2014 (UTC)

Sure I see that too, but it requires voters to lie about their judgments, and more importantly, to do so strategically.

If the qualified failure is awarded based on strategy leading to compliance, IRV leads to compliance under strategy.

Why does "semi-honest" matter when only compliance matters? In other words, when voters are consciously employing strategy, why does it matter how they do it?

What if Majority Judgment has three ratings "Good, OK, Bad"? Everyone votes again in the election above. Where is the equilibrium? Center left must lie, betraying their coalition, giving their second preferred L candidate the same rating "Bad" as the R candidate. That's a lie, because they are not equally preferred. There is nothing "semi-honest" about that. Statistically speaking, with regard to voter ordinals, 50% could be L>R, and 50% could be R>L! If you assume the same ratings "Bad" to be equal voter preferences (a false assumption), then that's a lie because voters actually prefer L>R, not L=R that's a lie.

Filingpro (talk) 19:08, 24 May 2014 (UTC)

Arguing your position, I might try to claim that its easier for voters to employ strategy with rating ballots than IRV. But the problem with that assertion is two fold. One, is its WP:OR opinion, and I'm not sure we have enough evidence to back up that claim. Two, consider the example above. How can center left voters be sure that rating their second preferred candidate L "Bad" will not elect their least preferred candidate "R"? Not so easy. This strategy requires a knowledge of how ballots are counted and how others will vote. We could just as well argue, that under a different IRV "center squeeze" election, a right voter knowing their least favorite candidate will win 'L' instinctively vote 'CL>R' as a defensive move, to see if they can get a better outcome in the Nash equilibrium. We would also need evidence to show voters who have perfect information under Nash strategy can not instinctively understand early elimination, (or whether or not they even have to understand it to know to try promoting their second favorite in the Nash game). This all seems way beyond what we can put in the article.

Filingpro (talk) 19:34, 24 May 2014 (UTC)

Perhaps the distinction you would like to make is now covered by the inclusion of FBC (I prefer Kevin Venzke's "Sincere Favorite"), and is now redundant. (Actually I think would prefer the name "First Choice First" or "First No Harm").

Filingpro (talk) 19:42, 24 May 2014 (UTC)

FINAL COMMENTS BEFORE CHANGE (WILL WAIT 2 WEEKS) PROPOSAL TO REMOVE CONDITIONAL FAILURE OF CONDORCET BY RATING METHODS

See also my comments above which have not been rebutted.

Consider 10 approval voters with three alternatives A, B, C, with cardinal preferences from 0 to 100, and an approval cut off of 50:

3 A (cardinal preferences A:100, B:40, C:0, approve only A)
3 B (cardinal preferences B:100, A:45, C:0, approve only B)
4 C (cardinal preferences C:100, B:10, A:0, approve only C)

C, the Condorcet loser is elected. B is the Condorcet winner.

The proposed standard (for conditional failure) is, is there always a possible strong semi-honest equilibrium for a CW?

Semi-Honest Oxymoron
In order for Condorcet Winner B to win, “A Voters” (or "C Voters") must know to approve B. But B is below their cutoff. In fact B is closer in rating to their most opposed candidate! Approving B is a lie, or at best insincere. (Examples I gave above with multi-level ratings and MJ are perhaps even more dishonest, because the voter has discrete levels to choose from yet disregards them).
Burr Dilemma
How do B voters know not to approve A (5 points below their threshold), to at least change the result from C to A, a better outcome? Can they depend on A voters to pull through and Approve B (10 points below their threshold)?

How do A voters know to vote for B, because B voters like A voters more than A voters like B voters. Will B voters compromise?

This appears to be a potentially unstable situation, where either A voters or B voters might benefit from a coalition betrayal as they face a game of chicken.

The Burr Dilemma has been well documented by professor Jack Nagel and cited.

I object to the use of Nash-Equilibrium (for use in the qualified failure) as it implies voters continuously adjusting their ballots with feedback until an optimal solution is obtained. I object for two reasons: (1) This is not what happens in a real election (i.e. continual adjustment) - in practice voters get to vote once and can not modify their vote once cast, and (2) Under such a feedback process IRV also reaches equilibrium (perhaps more efficiently and without the Burr Dilemma). Under continual adjustment, there is no evidence that it would not be equally obvious to an IRV voter to compromise vote for the Condorcet Winner if they could achieve a better outcome. There is no evidence that rating ballot voters would have any easier time knowing to change their intended sincere ratings. Both cases involve the act of raising their second choice to try to get a better outcome than their last choice, and knowing when to do so.

Thus I see and have heard no justification for awarding qualified failure to rating methods and not IRV.

Lastly, I have pointed out common voter scenarios where Approval, MJ etc, fail Condorcet (cases where there are simple vote splits) which IRV handles elegantly. Yet somehow these rating methods are elevated in the compliance table.

I propose removing these qualified failures.
Filingpro (talk) 03:31, 6 May 2015 (UTC)

Removed qualified failures of Approval, MJ, Range. Also removed qualified failure of MJ for Participation based on exact same reasoning argued above.Filingpro (talk) 07:41, 27 September 2015 (UTC)

I don't have the required knowledge nor references to make a contribution on this, but I noticed the compliance table is missing a number of common systems, specifically:

• Exhaustive ballot
• Plurality-at-large voting
• Preferential block voting
• STV

While none of the systems currently listed have identical attributes and while these systems may share the same attributes as another on the table, their popularity is great enough that they should not be omitted. Is someone with more knowledge and references able to add those to the table? 24.246.28.27 (talk) 00:29, 6 December 2015 (UTC)

The compliance table applies to single-winner systems only. Markus Schulze 10:50, 6 December 2015 (UTC)

D'oh. I missed that statement. What are your thoughts on a similar table for multi-winner systems? Some criteria don't seem to apply (although I could be wrong) but some criteria do seem to apply (although I could be wrong about that, too). 24.246.28.27 (talk) 03:00, 11 December 2015 (UTC)

Criteria for multi-winner systems are not well-defined, so a similar table for multi-winner methods would be even more controversial than this single-winner table. VoteFair (talk) 05:41, 13 December 2015 (UTC)

However, a compliance table for multi-winner methods, even partial and discussing controversial points, would be very useful. For example STV is accused not to satisfy many criteria, like monotonicity, consistency, participation, indipendence of irrilevant alternatives, vulnerability to various strategic voting. It seems that Schulze-STV and Satisfaction Approval Voting don't suffer of many of these problems, though they respect proportionality (or they "waste" less votes like STV is aimed to). Could you help for such a new compliance table? Armando Pitocco (talk) 07:33, 16 July 2016 (UTC)

Yes such a table would be useful. But Wikipedia is an encyclopedia so the facts conveyed in the table must be established facts, not opinions. Such facts are not available.

Note that "wasted votes" is not defined, even for single-winner methods. Also note that if "proportionality" regarding (ballot-supplied) political-party support was defined as a criterion, every method would fail because no method can achieve full proportionality, and there is no established way to assign a number that indicates a "distance" from full proportionality.

Again, the yes/no information for the criteria presented in the current table are well-defined for single-winner methods (with a few small exceptions), but not for multi-winner methods. VoteFair (talk) 20:01, 17 July 2016 (UTC)

I think that some criteria could be defined also in multi-winner methods. For example traditional STV (multi-winner) is non-monotonic, at least is what I know and read in a paper linked in the italian page. If we can't say yes/no for some methods we can leave a "?" and put an explaining note. About proportional representantion wikipedia mention PR-list and STV, so it is an existing "property" (maybe not strictly a criterion). About wasted votes, maybe we can find a consensus to explicit this concept, since it is an other commonly recognized property. For example a PR-list method without threshold waste less votes than one with a 5% threshold.

What I'm saying is that some properties exist, and where possible I think we should describe them. Where not we could explain why. Maybe we can't draw a compliance table, since it isn't so clear the situation? We can write a paragraph about methods comparisons.Armando Pitocco (talk) 20:44, 17 July 2016 (UTC)

I looked at Single transferable vote and it says STV fails monotonicity.

Another consideration is that there are many proportional methods, but the only "notable" ones are the ones actually used for governmental elections, and they are seriously flawed, mostly because they use single-mark ballots (or equivalent). In contrast, the better methods have not yet been used, and only a few of them have been written about in academic journals, so those are not yet notable and carefully analyzed. The result is that your suggested table would contain only a few rows (and only a couple of columns).

I agree that before jumping to a table it is necessary to create content in text form. There is not enough information to justify creating a table about proportional methods.

I share your desire to bring more attention to better proportional methods. After all, I've created a semi-proportional system called VoteFair ranking ([10]). (In my opinion methods that are "fully proportional" according to political party lead to fragmentation into too many parties to be handled using the usual coalition approach.) But to justify adding content on Wikipedia requires that first the methods must be better studied and analyzed, then written about in academic journals, and then the details can be summarized here. VoteFair (talk) 20:09, 20 July 2016 (UTC)

The methods we have talked about are already in Wikipedia singularly, so there is no problem in writing a paragraph to explain differences, according to what actual researches can say. In explaining the differences we can refer to some of single-winner criteria, where sources are enough. Armando Pitocco (talk) 16:49, 21 July 2016 (UTC)