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Social Choice Lectures 14 and 15. John Hey. Lectures 14 and 15: Arrow’s Impossibility Theorem and other matters. Plan of lecture: Aggregation of individual preferences into social preferences. Just two alternatives. More than 2 alternatives. Arrow’s axioms and his Impossibility Theorem.
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Social ChoiceLectures 14 and 15 John Hey
Lectures 14 and 15: Arrow’s Impossibility Theorem and other matters Plan of lecture: • Aggregation of individual preferences into social preferences. • Just two alternatives. • More than 2 alternatives. • Arrow’s axioms and his Impossibility Theorem. • Possibilities (relaxing some axiom): • (1) Borda Count, • (2) Single-peaked preferences/Median voter. • Conclusions
What are we trying to do in this lecture? • Starting with individual preferences over social alternatives, we will try and aggregate them into social preferences. • Let x ≥i y mean that individual i ( = 1, .., I) prefers alternative x to alternative y. • A social welfare function must assign a rational preference relation F(≥1,... ≥I) to any set ≥1,... ≥I.
Just two alternatives • Alternatives x and y. (One could be the status quo.) • I individuals. Preferences given by (α1,... αI) where each αtakes the value 1, 0 or -1 depending whether the individual prefers x, is indifferent, or prefers y. • A Social Welfare Functional is a rule that assigns a social preference, that is a number -1, 0 or 1, to each possible profile of individual preferences.
Just two alternatives: a simple example • F(α1,... αI) = 1 if Σiβiαi > 0, = 0 if Σiβiαi = 0 and = -1 if Σiβiαi < 0. • A particularly important case is when βi=1 for all i. This is just majority voting. • Dictatorship if αh = 1 (0, -1) implies F(α1,... αI) = 1 (0, -1). • Anonymity is implied by βi=k all i. • Neutral between alternatives if F(α1,... αI) = - F(-α1,... -αI) • Positively responsive if .... • May’s Theorem: A SWF is a majority voting SWF if and only if it is symmetric, neutral between alternatives and positively responsive.
Arrow’s Impossibility Theorem • There are at least three alternatives. • There are N individuals with transitive (perhaps different) preferences. • unanimity (or weak pareto): society ranks a strictly above b if all individuals rank a strictly above b. • independence of irrelevant alternatives: the social ranking of two alternatives a and b depends only on their relative ranking by every individual. • The Theorem: Any constitution that respects completeness, transitivity, independence of irrelevant alternatives and unanimity is a dictatorship.
Arrow’s Impossibility Theorem: Proofs • Of course, there is the original proof. • There is a nice example (with just 2 voters and 3 alternatives) on the site at www.luiss.it/hey/social choice/documents/arrow impossibility theorem.ppt • There is another nice example at www.luiss.it/hey/social choice/documents/john bone and arrow.ppt • There are three simple proofs in the paper by Geanakoplis which I have also put on the site: • www.luiss.it/hey/social choice/documents/geanakoplis 3 proofs of arrow.pdf. • There is also a proof in the book by Wulf Gaertner A Primer in Social Choice Theory, LSE Perspectives in Economic Analysis. I will follow this and perhaps look briefly at the nice example above.
An important preliminary • Let b be some arbitrary alternative. • We show: if every voter puts b either at the top or the bottom of his or her ranking, then so must society. • Proof: suppose to the contrary that for such a profile, then for distinct a, b and c, the social preference has a≥b and b≥c. • By independence this must continue even if all individuals move c above a. (No ab or bc votes would be disturbed.) • By transitivity a≥c but by unanimity c>a. Contradiction.
Proof of Arrow. We start with Unanimity and then move b up place by place and person by person
Looking for the Pivotal Voter (Keeping all the other alternatives fixed)
Table 1 (top) before and Table 2 (bottom) after the pivotal voter
Now we move alternative a • We move alternative a to the lowest position of individual i‘s ordering for i<m... • We move alternative a to the second lowest position of individual i‘s ordering for i>m... • We keep individual m as is... • ... Look at the bottom graph. Because of Independence social ranking does not change...
Table 1 (top) before and Table 2 (bottom) after the pivotal voter
Table 1’ (top) before and Table 2’ (bottom) after the pivotal voter- see Gaertner pages 26/7.
What is crucial is the Independence of Irrelevant Alternatives Axiom • The relative positions of a and b do not change for anyone going from table 1 to table 1’. • Note that the relative rankings differ from individual to individual (“People are Different”) but we have the same relative rankings for each individual in the two tables. • So a, being socially best in Table 1 remains so in Table 1’.
We can begin to see why the Pivotal Voter is a dictator – because a is socially chosen here.
Now move b downwards – a remains top.(Note that in Tables 1 and 1’ b is above a for 1 to m-1 and a is above b for m+1 to N)
Now identify a third alternative c – above b – a remains top, because all we have done is to identify c. (Step 3)(Note that in Tables 1 and 1’ b is above a for 1 to m-1 and a is above b for m+1 to N)
Now Reverse a and b for i >m Can b become best? NO because c is preferred to b by all. And c cannot be preferred to a since we have not changed the rankings of a and c.
Penultimately consider this (Step 5 first part) Pivotal Voter m is dictatorial. (Note that c cannot effect the social ranking between a and b)
... and finally (Step 5 second part) ...Pivotal Voter m is dictatorial wrt a versus any other option.
More than one dictator?! • Note that a was chosen arbitrarily at the start of this argument. • Hence there is a dictator for every a. • Can there be different dictators for different alternatives? • Obviously not – otherwise we would get contradictions (in the construction of the social ordering whenever these ‘potential dictators’ have individual orderings that are not the same). • Therefore there can only be one dictator. • FASCINATING!
Possibilities • Must relax some axiom to get a SWF: • (1) Borda Count, • (2) Single-peaked preferences/Median voter. • We note that the Borda count does not satisfy the pairwise independence condition. The reason is simple: the rank of any alternative depends upon the placement of every other alternative. • Single-peaked preferences put strong restrictions on the domain of preferences.
Borda Count • Suppose number of alternatives is finite. Denote generic alternatives by x and y. • For individual i,define the count ci(x) = n if x is the n’th ranked alternative in the order of i. (Indifference....) • Now define a SWF by adding up these counts – so • This preference relation is complete and transitive and Paretian. • However it does not satisfy the pairwise independence condition.
Single-Peaked Preferences • Let decision variable be x. • Suppose the utility of decision-maker i is u(x). • Suppose u(.) is single-peaked for all i, for example: • Not like this: • Then pairwise majority voting generates a well-defined social welfare functional. • See next slide.
Single-Peaked Preferences • Suppose all utility functions are single-peaked. • Here Agent 5 is the Median Agent • The value x5will beat any other value in majority voting.
Lectures 14 and 15 • SWFs are generally impossible (in the sense that unamity, independence of irrelevant alternatives and non-dictatorship are mutually inconsistent) • However in special cases: Borda rule; Single-peaked preferences; they are possible. These relax the restrictions implied above: the Borda count relaxes IIR and single-peaked preferences restrict the domain. • Is all of this surprising? • Why do we have politicians?