Social Choice Lecture 21 - PowerPoint PPT Presentation

About This Presentation
Title:

Social Choice Lecture 21

Description:

Social Choice Lecture 21 John Hey * * * * * * * * * * * * * * * * * * * * * * Voting Systems This and the previous two lectures concern voting systems. – PowerPoint PPT presentation

Number of Views:83
Avg rating:3.0/5.0
Slides: 28
Provided by: staticLu
Category:

less

Transcript and Presenter's Notes

Title: Social Choice Lecture 21


1
Social ChoiceLecture 21
  • John Hey

2
Voting Systems
  • This and the previous two lectures concern voting
    systems.
  • Voting is used to choose between alternatives.
  • We note that we have exactly the same problems
    (though rather more obviously manifested here) as
    we had when we discussed Arrow.
  • Basically if people have different preferences
    then it is difficult/impossible to aggregate
    them.
  • If we are trying to choose the most preferred,
    for example, President, if people have different
    preferences, what do we mean by most preferred?
  • I note, without shame, that most of this material
    I have taken from Wikipedia
  • http//en.wikipedia.org/wiki/Voting_system
    and linked pages.

3
Lectures on Voting Systems
  • Lecture 19, Thursday the 3th of December
    Single-Winner Voting Systems.
  • Lecture 20, Friday the 4th of December
    Historical and Factual description of voting
    systems.
  • Lecture 21, Thursday the 10th of December
    Multiple-Winner Voting Systems.

4
Lecture 21 Multiple-Winner Voting Systems
  • Proportional representation
  • Single transferable vote (2 sub-headings)
  • Party-list  (open or closed) (4 sub-headings)
  • Mixed-member
  • Semi-proportional representation
  • Cumulative voting
  • Limited voting (Single Non-transferable vote)
  • Parallel voting (Not discussed)
  • Non-proportional representation
  • Plurality-at-large
  • Preferential block voting

5
Proportional Representation
  • Proportional representation (PR), sometimes
    referred to as full representation, is aimed at
    securing a close match between the percentage of
    votes that groups of candidates (grouped by a
    certain measure) obtain in elections and the
    percentage of seats they receive. PR is a
    democratic principle rather than an electoral
    system in itself. It is often contrasted to
    plurality voting systems, where disproportional
    seat distribution results from the division of
    voters into multiple electoral districts,
    especially "winner takes all" plurality
    districts.
  • Various forms of proportional representation
    exist, such as party-list proportional
    representation, where the above-mentioned groups
    correspond directly with candidate lists as
    usually given by political parties. Within this
    form a further distinction can be made depending
    on whether or not a voter can influence the
    election of candidates within a party list (open
    list and closed list respectively).
  • Another kind of electoral system covered with the
    term proportional representation is the single
    transferable vote (STV), which, in turn, does not
    depend on the existence of political parties (and
    where the above-mentioned "measure of grouping"
    is entirely left up to the voters themselves.

6
Proportional Representation 1 Single
Transferable Vote
  • The Single transferable vote (STV) is a system of
    preferential voting designed to minimize "wasted"
    votes and provide proportional representation
    while ensuring that votes are explicitly
    expressed for individual candidates rather than
    for party lists.
  • In STV, each voter ranks the list of
  • candidates in order of preference. In other
  • words they place a '1' beside their most
  • preferred candidate, a '2' beside their
  • second most preferred, and so on. The
  • ballot paper submitted by the voter
  • therefore contains an ordinal list of candidates.

7
Single Transferable Vote Finding the Winners 1
  • There are clearly many methods. One can select
    winners sequentially, or one can select losers
    sequentially, and in either case re-distribute
    the votes. There is no unambiguously correct way
    to re-distribute the votes nor choose a method.
  • Many of these ways are very complicated and
    difficult to describe and understand.
  • They are prone to various problems including
    non-monotonicity, tactical voting and other
    paradoxes.
  • A common way is described on the following slide.

8
Single Transferable Vote Finding the Winners 2
  • Define the DROOP QUOTA m/(n1)1 where m is the
    number of valid votes and n is the number of
    winners.
  • The Droop quota is the smallest number that
    guarantees that no more candidates can reach the
    quota than the number of seats available to be
    filled.
  • Any candidate who has reached or exceeded the
    required quota is declared elected.
  • If not enough candidates have been elected, the
    count continues.
  • If an elected candidate has more votes than the
    quota, then that candidate's surplus is
    transferred to other candidates according to the
    next preference on each voter's ballot.
  • If no one meets the quota, the candidate with the
    fewest votes is eliminated and that candidate's
    votes are transferred.
  • This process repeats from step 1 until the
    required number of candidates have been elected.
  • Whether votes are transferred to elected
    candidates depends on the particular counting
    system chosen systems that allow this
    subsequently redistribute the surplus.

9
STV A Wikipedia example
  • 57 voters, 4 candidates, 2 places.
  • Droop Quota 57/(21)1 20
  • In the first round, Andrea receives 40 votes and
    Delilah 17. Andrea is elected with 20 excess
    votes. Her 20 excess votes are reallocated to
    their second preferences. For example, 12 of the
    reallocated votes go to Carter, 8 to Brad.
  • As none of the remaining candidates have reached
    the quota, Brad, the candidate with the fewest
    votes, is excluded from the count. All of his
    votes have Carter as the next-place choice, and
    are reallocated to Carter. This gives Carter 20
    votes and he is elected, filling the second seat.

10
Problems with STV
  • Defining the Quota (other quotas proposed).
  • Redistributing the excess votes of the elected
    candidates.
  • Redistributing the votes of the excluded
    candidates.
  • Complexity.
  • When STV is used for single-winner elections, it
    is equivalent to the non-proportional
    instant-runoff voting method. This is
    non-monotonic and hence so is STV.
  • It also does not satisfy the independence of
    irrelevant alternatives criterion.
  • It also seems vulnerable to tactical voting.

11
Proportional Representation 2 Party List
  • Party-list proportional representation systems
    are a family of voting systems emphasizing
    proportional representation (PR) in elections
    returning multiple candidates.
  • In these systems, parties make lists of
    candidates to be elected, and seats get allocated
    to each party in proportion to the number of
    votes the party receives. Voters may vote
    directly for the party, as in Israel, for
    candidates and that vote will pool to the party,
    as in Turkey and Finland, or for a list of
    candidates, as in Hong Kong.
  • The order in which a party's list candidates get
    elected may be pre-determined by some method
    internal to the party or the candidates (a closed
    list system) or it may be determined by the
    voters at large (an open list system).

12
Proportional Representation 2.1 DHondt method
  • In a closed list system, each voter casts a
    single vote for the party of their choice. In an
    open list system, the voter votes for a candidate
    personally, but the vote is principally counted
    as a vote for the candidate's party.
  • After all the votes have been tallied, successive
    quotients or 'averages' are calculated for each
    list. The formula for the quotient is V/(s1),
    where
  • V is the total number of votes that list
    received and
  • s is the number of seats that party has been
    allocated so far (initially 0 for all parties)
  • Whichever list has the highest quotient or
    average gets the next seat allocated, and their
    quotient is recalculated given their new seat
    total. The process is repeated until all seats
    have been allocated.
  • The order in which seats allocated to a list are
    then allocated to individuals on the list is
    irrelevant to the allocation procedure. It may be
    internal to the party (a closed list system) or
    the voters may have influence over it through
    various methods (an open list system).
  • The rationale behind this procedure (and the
    Sainte-Laguë procedure) is to allocate seats in
    proportion to the number of votes a list
    received, by maintaining the ratio of votes
    received to seats allocated as close as possible.
    This makes it possible for parties having
    relatively few votes to be represented.

13
Proportional Representation 2.1 DHondt method
Wikipedia example
14
Proportional Representation 2.2 Highest average
method
  • The highest averages method is one way of
    allocating seats proportionally for
    representative assemblies with party list voting
    systems.
  • The highest averages method requires the number
    of votes for each party to be divided
    successively by a series of divisors, and seats
    are allocated to parties that secure the highest
    resulting quotient or average, up to the total
    number of seats available. The most widely used
    is the d'Hondt formula, using the divisors
    1,2,3,4... The Sainte-Laguë method divides the
    votes with odd numbers (1,3,5,7 etc). The
    Sainte-Laguë method can also be modified, for
    instance by the replacement of the first divisor
    by 1.4, which in small constituencies has the
    effect of prioritizing proportionality for larger
    parties over smaller ones at the allocation of
    the first few seats.
  • Notice that this is a generalisation of the
    DHondt method.

15
Proportional Representation 2.3 Largest
remainder method
  • The largest remainder method requires the number
    of votes for each party to be divided by a quota
    representing the number of votes required for a
    seat, and this gives a notional number of seats
    to each, usually including an integer and either
    a vulgar fraction or alternatively a remainder.
    Each party receives seats equal to the integer.
    This will generally leave some seats unallocated
    the parties are then ranked on the basis of the
    fraction or equivalently on the basis of the
    remainder, and parties with the larger fractions
    or remainders are each allocated one additional
    seat until all the seats have been allocated.
    This gives the method its name.
  • Notice that it is relatively easy to understand.
  • However it is prone to the Alabama Paradox in
    which increasing the number of seats may cause a
    party to lose a seat (see end).

16
Proportional Representation 3 Mixed Member
  • Mixed member proportional representation, also
    termed mixed-member proportional voting and
    commonly abbreviated to MMP, is an 'additional
    member' voting system used to elect
    representatives to numerous legislatures around
    the world. MMP is similar to other forms of
    proportional representation (PR) in that the
    overall total of party members in the elected
    body is intended to mirror the overall proportion
    of votes received it differs by including a set
    of members elected by geographic constituency who
    are deducted from the party totals so as to
    maintain overall proportionality. Therefore, the
    additional party seats are compensatory they top
    up the local results.
  • In most models the voter casts two votes one for
    a constituency representative and one for a
    party. If a candidate is on the party list, but
    wins a constituency seat, they do not receive two
    seats they are instead crossed off the party
    list and replaced with the next candidate down.
    In the original variant used at first in Germany,
    still used by two States of Germany, both votes
    were combined into one, so that voting for a
    representative automatically means also voting
    for the representative's party. Most of Germany
    changed to the two-vote variant to make local MPs
    more personally accountable. Voters can vote for
    the local person they prefer for local MP without
    regard for party affiliation, since the partisan
    make-up of the legislature is determined only by
    the party vote. In the 2005 New Zealand election,
    20 of local MPs were elected from electorates
    (constituencies) which gave a different party a
    plurality of votes.

17
Proportional Representation 3 Mixed Member
Problems
  • Used in many countries.
  • Prone to tactical voting.
  • Difficult to understand.

18
Semi Proportional Representation 1 Cumulative
Voting
  • An alternative method called Cumulative voting
    (CV) is a semi-proportional voting system in
    which each voter has n votes, where n is the
    number of seats to be elected. Voters can
    distribute portions of their vote between a set
    of candidates, fully upon one candidate, or a
    mixture. It is considered a proportional system
    in allowing a united coalition representing a
    m/(n1) fraction of the voters to be guaranteed
    to elect m seats of an n-seat election. For
    example in a 3-seat election, 3/4 of the voters
    (if united on 3 candidates) can guarantee control
    over all three seats.

19
Semi Proportional Representation 2 Limited Voting
  • Limited voting is an electoral system used in
    multi-member constituency elections in which
    electors have fewer votes than there are
    positions available.
  • The positions are awarded to the candidates who
    receive the most votes absolutely. In a n-seat
    constituency, the n candidates receiving the
    largest numbers of votes would win office.
  • In the special case in which the voter may vote
    for only one candidate and there are two or more
    posts, this system is called the single
    non-transferable vote or sometimes the strictly
    limited vote.

20
Non Proportional Representation 1
Plurality-at-large
  • Plurality-at-large voting (commonly referred to
    as block voting) is a voting system for electing
    several representatives from a single multimember
    electoral district using a series of check boxes
    and tallying votes similar to a plurality
    election. Although multiple winners are elected
    simultaneously, block voting is not a system for
    obtaining proportional representation instead,
    the usual result is that the largest single group
    wins every seat by electing a slate of
    candidates, resulting in a landslide.
  • In a block voting election, all candidates run
    against each other for n number of positions.
    Each voter selects up to n candidates on the
    ballot, and the n candidates with the most votes
    win the positions. Often, voters are said to have
    "n votes", however they are unable to vote for
    the same candidate more than once as in
    cumulative voting.

21
Non Proportional Representation 2 Preferential
Block Voting
  • Preferential block voting is a voting system for
    electing several representatives from a single
    multimember constituency. Unlike the single
    transferable vote, preferential block voting is
    not a method for obtaining proportional
    representation, and instead produces similar
    results to plurality block voting. Under both
    systems, a single group of like-minded voters can
    win every seat, making both forms of block voting
    non-proportional.
  • In preferential block voting, a preference voting
    ballot is used, ranking candidates from most to
    least preferred. Alternate ballot forms may have
    two groupings of marks, first giving n votes for
    an n seat election (as in traditional bloc
    voting), but also allowing the alternate
    candidates to be ranked in order of preference
    and used if one or more first choices are
    eliminated.
  • Candidates with the smallest tally of first
    preference votes are eliminated (and their votes
    transferred as in instant runoff voting) until a
    candidate has more than half the vote. The count
    is repeated with the elected candidates removed
    and all votes returning to full value until the
    required number of candidates is elected.
  • Both this and the plurality method are subject to
    tactical voting (see later). While many criticize
    block voting's tendency to create landslide
    victories, some cite it as a strength. Since the
    winners of a block voting election generally
    represent the same slate or group of voters,
    there is greater agreement amongst those elected,
    potentially leading to a reduction in political
    gridlock.

22
Some oddities
  • Monotonicity
  • Tactical Voting
  • The Alabama Paradox

23
Monotonicity
  • A candidate x should not be harmed (i.e., change
    from being a winner to a loser) if x is raised on
    some ballots without changing the orders of the
    other candidates.
  • Or conversely a candidate should not be
    benefitted if x is lowered in some ballots
    without changing the order of other candidates.
  • Example with Instant runoff. Between Left and
    Right below, Andrea has more support. On left,
    Cynthia is eliminated and then Andrea wins. On
    right, Belinda is eliminated and then Cynthia
    wins.

24
Tactical Voting
  • Suppose 100 voters vote as follows
  • Far-Left candidate 10 Centre-Left
    candidate 41
  • Centre-Right candidate 40 Far-Right
    candidate 9
  • Provided we assume that the second preference of
    Far-Left voters is the Centre-Left candidate, and
    the second preference of Far-Right voters is the
    Centre-Right candidate, then the result of the
    second round of a runoff election will be
  • Centre-Left candidate 51 Centre-Right
    candidate 49
  • In this election tactical voting will be an
    unnecessary and ineffective tactic. This is
    because once the Far-left Candidate is eliminated
    his supporters have the opportunity to vote for
    the Centre-Left candidate in the second round, so
    it is unnecessary for Far-Left supporters to vote
    tactically for the Centre-Left candidate as a way
    of ensuring she survives to the second round. For
    the same reason the outcome will not be altered
    if Far-Right supporters vote tactically in the
    first round for Centre-Right.
  • Were the election conducted using the plurality
    system compromising would be an effective
    strategy. For example if Far-Right supporters
    voted tactically for Centre-Right then he would
    be elected instead of Centre-Left. To counteract
    this tactic Far-Left supporters would also have
    to vote tactically. In this example, therefore,
    runoff voting removes the potential for tactical
    voting that would be there under the plurality
    system.

25
The Alabama Paradox
  • After the 1880 census, C. W. Seaton, chief clerk
    of the United States Census Bureau, computed
    apportionments for all House sizes between 275
    and 350, and discovered that Alabama would get 8
    seats with a House size of 299 but only 7 with a
    House size of 300. Here is a simplified example
    using the largest remainder rule.

26
Conclusions
  • After Lecture 19, on single-winner systems, we
    concluded that there does not appear to be a
    perfect voting system.
  • We were not surprised.
  • We asked then Might going to a Multiple-Winner
    System help?
  • It does not appear so! In fact, perhaps the
    contrary things become more complicated.
  • What a surprise!!

27
Lecture tomorrow
  • This is another example of an experiment.
  • Please be at the CESARE lab at 11.00 tomorrow
    morning.
  • We will run Charlie Holts Voting Game.
  • You can check this out at http//veconlab.econ.vir
    ginia.edu/vt/vt.php.
  • You will log in at
  • http//veconlab.econ.virginia.edu/login.htm
  • You will have to register (tomorrow in the lab)
    as a participant in the session with a name I
    will give you tomorrow. ENJOY!
Write a Comment
User Comments (0)
About PowerShow.com