unanimity$86338$ - перевод на греческий
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unanimity$86338$ - перевод на греческий

THEOREM THAT WITH ≥3 OPTIONS, NO RANKED VOTING SYSTEM CAN CONVERT INDIVIDUALS’ PREFERENCES INTO A COMPLETE TRANSITIVE RANKING WHILE ALSO FULFILLING UNRESTRICTED DOMAIN, NONDICTATORSHIP, PARETO EFFICIENCY AND INDEPENDENCE OF IRRELEVANT ALTERNATIVES
Arrow's Impossibility Theorem; Arrow's paradox; Arrow's theorem; Arrow's Theorem; General Possibility Theorem; Arrow Impossibility Theorem; Arrow’s Theorem; General possibility theorem; Arrow impossibility theorem; Arrows theorem; Arrow's Impossibility theorem; Arrows impossibility theorem; Arrow theorem; Arrow's Theorum; Arrows conditions; Arrow's Paradox; Non-imposition; Arrow Impossibility theorem; Arrow’s paradox; Arrow’s impossibility theorem; Unanimity criterion; Arrow possibility theorem
  • Part one: Successively move '''B''' from the bottom to the top of voters' ballots.  The voter whose change results in '''B''' being ranked over '''A''' is the ''pivotal voter for'' '''B''' ''over'' '''A'''.
  • Part three: Since voter ''k'' is the dictator for '''B''' over '''C''', the pivotal voter for '''B''' over '''C''' must appear among the first ''k'' voters.  That is, ''outside'' of segment two.  Likewise, the pivotal voter for '''C''' over '''B''' must appear among voters ''k'' through ''N''.  That is, outside of Segment One.
  • Part two:  Switching '''A''' and '''B''' on the ballot of voter ''k'' causes the same switch to the societal outcome, by part one of the argument.  Making any or all of the indicated switches to the other ballots has no effect on the outcome.

unanimity      
n. ομοφωνία, ομογνωμοσύνη, ομοθυμία

Определение

unanimously

Википедия

Arrow's impossibility theorem

Arrow's impossibility theorem, the general possibility theorem or Arrow's paradox is an impossibility theorem in social choice theory that states that when voters have three or more distinct alternatives (options), no ranked voting electoral system can convert the ranked preferences of individuals into a community-wide (complete and transitive) ranking while also meeting the specified set of criteria: unrestricted domain, non-dictatorship, Pareto efficiency, and independence of irrelevant alternatives. The theorem is often cited in discussions of voting theory as it is further interpreted by the Gibbard–Satterthwaite theorem. The theorem is named after economist and Nobel laureate Kenneth Arrow, who demonstrated the theorem in his doctoral thesis and popularized it in his 1951 book Social Choice and Individual Values. The original paper was titled "A Difficulty in the Concept of Social Welfare".

In short, the theorem states that no rank-order electoral system can be designed that always satisfies these three "fairness" criteria:

  • If every voter prefers alternative X over alternative Y, then the group prefers X over Y.
  • If every voter's preference between X and Y remains unchanged, then the group's preference between X and Y will also remain unchanged (even if voters' preferences between other pairs like X and Z, Y and Z, or Z and W change).
  • There is no "dictator": no single voter possesses the power to always determine the group's preference.

Cardinal voting electoral systems are not covered by the theorem, as they convey more information than rank orders. Gibbard's theorem and the Duggan–Schwartz theorem show that strategic voting remains a problem. The axiomatic approach Arrow adopted can treat all conceivable rules (that are based on preferences) within one unified framework. In that sense, the approach is qualitatively different from the earlier one in voting theory, in which rules were investigated one by one. One can therefore say that the contemporary paradigm of social choice theory started from this theorem.

The practical consequences of the theorem are debatable. Arrow has said: "Most systems are not going to work badly all of the time. All I proved is that all can work badly at times." When asked what he would change about US elections, he said, "The first thing that I'd certainly do is go to a system where people ranked all the candidates."