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VOTING SYSTEMS

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In this section we discuss different types of ways to count the votes. ... a vote for favorite USS Enterprise Captain on the Star Trek TV shows and movies. ... – PowerPoint PPT presentation

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Title: VOTING SYSTEMS


1
VOTING SYSTEMS
  • Section 2.5

2
Introduction
  • The rights and duties of a citizen are captured
    in a simple one word mantra VOTE!
  • In this section we discuss different types of
    ways to count the votes.
  • Counting the votes is the heart of democracy
  • Is the counting fair? How well does the counting
    work? These are the questions of Voting Theory.
  • Not to disappoint you but a mathematical
    economist by the name of Kenneth Arrow has a
    theorem called Arrows Impossibility Theorem.
  • The Arrow Theorem states that a method for
    determining election results that is democratic
    and always fair is a mathematical impossibility.
  • Donal Saari a Mathematican and author of Chaotic
    Elections! A Mathematician Looks at Voting, has
    said For a price I will serve as a consultant
    to your group for your next election. Tell me who
    you want to win and I will devise a 'democratic
    process' which ensures the election of your
    candidate.

3
Preference Ballots
  • The voters of a club, or the UN Security Council
    or the IOC, use ballots to express the opinions
    of the constituency.
  • A preference ballot is a ballot that ranks the
    choices or candidates by preference.

4
Preference Schedule
  • When we tabulate the ballots, we put the results
    into a preference schedule. The schedule below is
    a vote for favorite USS Enterprise Captain on the
    Star Trek TV shows and movies.

5
Reading the preference schedule
  • The total number of ballots cast are
    141084137.
  • We see that Kirk received 14 first place votes.
  • Archer received 11 first place votes.
  • Pike received 8 first place votes, and Piccard
    got 4 first place votes.
  • Since James T. Kirk received the most first place
    votes we can declare him the winner.
  • This is an example of using the plurality method
    to determine the winner of an election.

6
Majority vs. Plurality
  • Winning an election with a majority is when a
    candidate receives 501 first place votes or
    more.
  • The plurality method says that the candidate with
    the most first place votes is the winner.
  • In the preference schedule from before, we saw
    that there were a total of 37 votes.
  • A candidate winning with a majority would need 19
    first place votes.
  • None of the candidates received a majority.
  • Kirk won the election with a plurality of 14
    votes.
  • President Clinton never won a majority of the
    popular vote in his two elections. The only
    President not to do so.

7
The problems with Plurality
  • The plurality method has many flaws and is
    considered a poor method for choosing a winner of
    an election.
  • The Condorcet Criterion states that if there is a
    candidate in head-to-head comparisons is
    preferred by the voters over each of the other
    choices, then that choice should be the winner.
  • The plurality method violates this criterion.
  • In the previous example, 14 voters preferred
    Kirk, while 23 voters preferred someone other
    than Kirk.

8
Pairwise Comparison Method (Copelands Method)
  • The method of pairwise comparison is like a
    round-robin tournament. Each candidate is matched
    head-to-head with every other candidate.
  • If a candidate wins a head-to-head matchup, they
    receive 1 point. If the matchup is tied each
    candidate gets ½ a point.

9
How many matchups???? Who wins???
  • To determine the correct number of matchups, use
    the combination formula .
  • We have four candidates in the election and 2
    candidates in a matchup, so use 4 choose 2. Which
    is 6.
  • Here are the matchups
  • Kirk vs. Piccard 23 voters prefer Piccard, 14
    prefer Kirk thus Piccard gets the head-to-head
    victory. One point for Piccard.
  • Kirk vs. Pike 23 voters prefer Pike, 14 prefer
    Kirk, thus Pike gets the victory and the point.
  • Kirk vs. Archer 23 voters prefer Archer, 14
    prefer Kirk, Archer wins the matchup and gets a
    point.
  • Piccard vs. Pike 28 voters prefer Piccard, 9
    prefer Pike, Piccard gets the point. Piccard has
    two points.
  • Piccard vs. Archer 19 voters preferred Archer,
    only 18 for Piccard, thus Archer gets the point
    and she now has two.
  • Pike vs. Archer 25 voters preferred Archer, only
    12 for Pike, Archer gets a point and he now has
    three points.
  • Archer got 3 points, Piccard 2 points, Pike 1
    point, Kirk 0 points. Jonathan Archer is your
    winner.

10
Whats wrong with Pairwise Comparisons
  • Pairwise Comparisons violate a criterion known
    as Independence-of-irrelevant-Alternatives.
  • What this means is that if choice X wins an
    election, and one or more other choices are
    disqualified, then when the ballots are
    recounted, choice X should still win the election.

11
Borda Count Method
  • Each voter ranks all of the candidates. If there
    are k candidates, each candidate receives k
    points for 1st choice, k 1 points for second
    choice, and so on. The candidate with the most
    points is declared the winner.
  • The Borda Count method takes into account all the
    information from the ballot and it produces the
    best compromise candidate. The problem with Borda
    Count is that it can violate the majority
    criterion. That is a candidate could have the
    majority of the 1st place votes but lose with the
    Borda Count.

12
Borda Count Example
  • Referring to the preference schedule slide, we
    see that there are 4 candidates in the election.
    First choice receives 4 points, second choice
    receives 3 points, third choice receives 2
    points, and fourth choice receives 1 point.
  • Kirk received 14 first choice votes and 23 fourth
    choice votes for a Borda Count total of (14 x 4)
    (0 x 3) (0 x 2) (23 x 1) 79 points
  • Archer received 11 first choice votes, 8 second
    choice votes and 18 third choice votes for a
    Borda Count total of (11 x 4) (8 x 3) (18 x
    2) (0 x 1) 44 24 36 104 points.
  • Pikes Borda Count is (8 x 4) (5 x 3) (10 x
    2) (14 x 1) 32 15 20 14 81 points.
  • Piccards Borda Count is (4 x 4) (24 x 3) (9
    x 2) 16 72 18 106 points.
  • Jean-Luc Piccard wins the election in the Borda
    Count Method.

13
Borda Count Example 2
  • This example shows how Borda Count violates the
    majority criterion.

14
Example 2 Continued
  • Since there are 11 voters in the preference
    schedule, 6 votes are needed for a majority.
  • Candidate Foster has received 6 votes. Under a
    majority rules, Foster should be declared the
    winner.
  • However if Borda Count is used we see the
    following
  • Foster gets (6 x 4) (5 x 1) 29 points
  • Winkel gets (2 x 4) (9 x 3) 35 points
  • Heerey gets (3 x 4) (2 x 3) (6 x 2) 30
    points
  • LeVarge gets (3 x 3) (2 x 2) (6 x 1) 16
    points
  • Under the Borda Count rule, Winkel would be
    declared the winner.

15
Ranked-Choice or Instant Run-Off Method
  • Each voter ranks all of the candidates first,
    second, third, etc. If a candidate receives a
    majority of the first choice votes, that
    candidate is declared the winner.
  • If no candidate receives a majority, then the
    candidate that received the fewest first choice
    votes is eliminated. Those votes are given to the
    next preferred candidate.
  • If a candidate now has a majority, that candidate
    is declared the winner. If no candidate has a
    majority, then the process continues.

16
Instant Run-Off Example
  • Referring back to our preference schedule, we see
    that Kirk has 14 first choice votes, Archer has
    11 first choice, Pike has 8 first choice votes,
    and Piccard got 4 first choice votes.
  • Since Piccard got only 4 first choice votes he is
    now eliminated.
  • Those candidates below Piccard now move up in the
    preference schedule.

17
Instant Run-Off Example
  • Now Kirk has 14 first choice votes, Pike has 12
    first choice votes, and Archer has 11 first
    choice votes.
  • Again no candidate has a majority so Archer is
    eliminated.
  • The candidates below Archer move up in the
    preference schedule.

18
Instant Run-Off Example
  • Now we see that Kirk only has 14 first choice
    votes and Pike has 23 first choice votes.
  • Christopher Pike is declared the winner of this
    election by the instant run-off method.
  • The problem with Instant run-off is that it
    violates the Monotonicity criterion.
  • The criterion states that if choice X is the
    winner of an election, and in a reelection, the
    only changes in the ballots are changes that only
    favor X, then X should remain the winner.

19
Section 2.5 12
  • Four candidates Harrison (H), Lennon (L),
    McCartney (M) and Starr (S) are running for
    regional manager. After the polls close the
    ranked ballots are tallied, the preference table
    is given to the right.

20
Questions
  • How many votes were cast?
  • Use the Plurality method to determine the winner.
  • What percent of the votes did the winner in
    number 2 receive?
  • Use instant run-off method to determine the
    winner.
  • What percent of the votes did the winner in
    number 4 receive?
  • Use Borda Count to determine the winner.
  • How many points did the winner in number 6
    receive?
  • Use pairwise comparison to determine the winner.
  • How many points did the winner receive in number
    8?
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