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Spatial models of elections

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Political parties and electoral competition ... if Ui(A) Ui(B), then the probability that i votes for A is piA=1 and hence piB=0 ... – PowerPoint PPT presentation

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Title: Spatial models of elections


1
Lecture 6
  • Spatial models of elections
  • Readings Shepsle, Analyzing politics, chapter 5

2
Direct versus indirect democracy
  • In the previous lecture we asked how individuals
    vote on policies and what is the outcome of the
    voting process
  • The outcome of the voting process should be a
    policy that is the Condorcet winner in the set of
    feasible policies
  • However, in reality citizens rarely vote directly
    on policies (example of direct vote on policy
    referendum)
  • In representative democracies citizens vote on
    candidates who choose then policies on their
    behalf

3
Political parties and electoral competition
  • We can still assume that citizens indirectly
    choose policies through candidates platforms
    according to the same criteria outlined in
    previous lectures
  • But in this case the crucial question becomes
    how do parties choose platforms? And more
    generally, how do parties enter in the political
    competition?

4
Downsian model of party competition
  • The basic assumption of the Downsian model is
    that parties formulate policies in order to win
    elections
  • In other words, every party tries to maximise its
    votes
  • The second important step in the model is the
    assumption that the median voter theorem holds

5
Downsian model of party competition
  • Median voter theorem If all voters preferences
    are single peaked on a single dimension, then the
    most preferred point of the median voter is a
    Condorcet winner
  • Two parties compete for election
  • Parties compete on a single dimension
  • We can order the single dimension policies on a
    line
  • Citizens have single peaked preferences

6
Which platform will parties choose?
A
B
C
x
y
1
2
3
4
5
0
7
Optimal party location
  • When
  • parties care about winning elections
  • the median voter theorem holds
  • The Downsian model of political competition with
    two parties predicts a Nash Equilibrium where
    the party platforms converge to the median voter

8
Party convergence
  • Do we observe parties convergence in real world
    elections?
  • While the tendency to convergence is plausible,
    parties clearly do not always converge
  • In fact, divergence is common and party
    polarization is typical of most political races
    in modern democracies

9
Causes of party divergence
  • Politicians policy motivation (lack of
    commitment technology)
  • Uncertainty about voters preferences
  • if the two previous assumptions hold
  • Alesina (AER,1988) shows that in a one shot game
    the two parties will diverge and in particular
    they will run with their most preferred platforms

10
Causes of party divergence
  • Although parties may have an incentive to
    announce platforms that are closer to the median
    voter, those announcements would not be credible
  • On the other hand, if the game is repeated, in
    some cases parties may credibly commit to choose
    a compromise policy that would be implemented
    whether they are in power or the other party is
    in power

11
Condorcet Paradox and party competition
  • As we have seen in previous lectures, it is not
    very difficult to construct examples where the
    Condorcet winner does not exists
  • Remember divide the dollar game
  • Any problem of sharing a fixed amount of
    resources among a given number if individuals
    (ex budget allocation) would be affected by the
    so called Condorcet paradox (cycling majority)

12
Condorcet Paradox and party competition
  • If we apply this paradox to the political
    competition, we would obtain that each party can
    get the majority of votes through a marginal
    change of his platform so that we cannot observe
    convergence to a Condorcet winner
  • A party can switch from the state of loosing the
    election to the state of winning by marginally
    changing its platform
  • In other words, the pay-offs of parties are not
    continuous in platforms and for this reason we
    cannot obtain an equilibrium party platform

13
Condorcet Paradox and party competition
  • If parties pay-offs were continuous it would be
    possible to obtain equilibrium party platforms
  • If by marginally changing platforms parties would
    not be in the situation of winning or loosing for
    sure elections, than we would be able to overcome
    the Condorcet paradox
  • If there is some uncertainty on the preference of
    voters, than the status of parties would not
    which from losers to winner when platforms are
    altered since they would be winning/loosing with
    some probability, given any possible platform
    announcement

14
Deterministic voting
  • Let pix be the probability that individual i
    votes in favour of alternative x
  • Let Ui(x) be the utility i derives from x
  • In a deterministic voting setting preferences of
    people are known and given any two possible
    alternatives A and B, if Ui(A)gtUi(B), then the
    probability that i votes for A is piA1 and hence
    piB0

15
Probabilistic voting
  • In a probabilistic voting setting we assume that
    because of a random shock, the voting rule of
    individual i is as follows
  • i votes A over B if and only if Ui(A)-Ui(B)ejgt0
    where ej is a random shock i.i.d. across
    individuals
  • Therefore, the probability that i votes A over B
    is a continuous function depending on Ui(A),
    Ui(B) and ej
  • piAf(Ui(A), Ui(B), ej)
  • Let F(.) be the probability distribution function
    of the random shocks
  • Remember that F(x)Probejltx and
    1-F(x)Probejgtx
  • piAProbUi(A)-Ui(B)ejgt0
  • piAProbejgtUi(A)-Ui(B)F(Ui(A)-Ui(B))

16
Probabilistic voting
  • Since candidates are not sure to win elections
    just proposing a given platform, their payoffs
    become a function of the platform and the
    probability of winning for every platform
  • It is possible to show that if the probability
    function is strictly concave, than the
    equilibrium of the game is unique and both
    candidates offer the same platform
    (Coughlin-Nitzan)

17
Questions
  • Assume that individuals have different
    preferences for percentage x of healthcare
    services that should be provided by the
    government. Let f(x) with 0ltxlt1 be the density
    function describing the distribution of
    preferences and assume that distribution is the
    following

f(x)
x
1
18
Questions
  • Show on the diagram the median of the
    distribution
  • Suppose that, given the above distribution, two
    parties have to choose their political platform
    specifying the percentage of healthcare that
    they would provide if they win the elections.
    Which platform will the two parties choose in
    equilibrium?
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