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Condorcet's example is already enough to see the impossibility of a fair ranked voting system, given stronger conditions for fairness than Arrow's theorem assumes. [20] Suppose we have three candidates ( A {\displaystyle A} , B {\displaystyle B} , and C {\displaystyle C} ) and three voters whose preferences are as follows:
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English: This diagram accompanies part one of the proof Arrow's Impossibility Theorem. It illustrates the process of successively moving one candidate from the bottom to the top of ballots. It illustrates the process of successively moving one candidate from the bottom to the top of ballots.
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The work culminated in what Arrow called the "General Possibility Theorem," better known thereafter as Arrow's (impossibility) theorem. The theorem states that, absent restrictions on either individual preferences or neutrality of the constitution to feasible alternatives, there exists no social choice rule that satisfies a set of plausible ...
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Arrow's impossibility theorem is a key result on social welfare functions, showing an important difference between social and consumer choice: whereas it is possible to construct a rational (non-self-contradictory) decision procedure for consumers based only on ordinal preferences, it is impossible to do the same in the social choice setting ...
In social choice theory, independence of irrelevant alternatives is often stated as "if one candidate (X) would win an election without a new candidate (Y), and Y is added to the ballot, then either X or Y should win the election." Arrow's impossibility theorem shows that no reasonable (non-random, non-dictatorial) ranked voting system can ...