Example with contrary half preference votes
Lucien Saumur
aa447 at freenet.carleton.ca
Thu Jul 11 10:59:11 PDT 1996
In an article, dfb at bbs.cruzio.com (Mike Ossipoff) writes:
>Say we were using Condorcet's method, with the added provision,
>recently proposed, that if a ballot ranks X & Y equally, below
>everything else in the Smith set, then that ballot is counted
>as casting half a vote for X over Y, & half a vote for Y over
>X.
>
>Sincere rankings:
>
>46%: Dole, Clinton, Nader
>20%: Clinton
>34%: Nader, Clinton, Dole
>
>Dole voters truncate:
>
>46%: Dole
>20%: Clinton
>34%: Nader, Clinton
>
>With the compulsory contrary half preferences provision,
>Dole wins. Without it, Clinton wins. Clinton is the Condorcet
>winner, & Dole is the only candidate over whom a majority
>has ranked someone else.
I am trying to understand the "lease-beaten" concept and I do
not understand why Clinton would win rather than Dole, with or
without half preferences.
I have designed the following matrices to explain what I
understand. Please explain where I have gone wrong.
[Theses matrices should be viewed using the "Courrier" font and
may contain transcription and other errors.]
The following matrix explains how I would tally the "sincere
rankings". Clinton wins.
AGAINST:
|DOLE |CLINT|NADER|
|-----|-----|-----|
FOR |XXXXX| 46 | 46 |
DOLE |XXXXX| 0 | 10 |
|XXXXX| 0 | 0 |
|XXXXX|____ |____ |
|XXXXX| 46 | 56 |
|XXXXX|(-8) |(+12)|
|-----|-----|-----|
FOR | 0 |XXXXX| 46 |
CLINTON | 20 |XXXXX| 20 |
| 34 |XXXXX| 0 |
|____ |XXXXX|____ |
| 54 |XXXXX| 66 |
|(+8) |XXXXX|(+32)|
|-----|-----|-----|
FOR | 0 | 0 |XXXXX|
NADER | 10 | 0 |XXXXX|
| 34 | 34 |XXXXX|
|____ |____ |XXXXX|
| 44 | 34 |XXXXX|
|(-12)|(-32)|XXXXX|
|-----|-----|-----|
The following matrix explains how I think that you are tallying
the "sincere rankings". Clinton also wins.
AGAINST:
|DOLE |CLINT|NADER|
|-----|-----|-----|
FOR |XXXXX| 46 | 46 |
DOLE |XXXXX| 0 | - |
|XXXXX| 0 | 0 |
|XXXXX|____ |____ |
|XXXXX| 46 | 46 |
|XXXXX|(-8) |(+12)|
|-----|-----|-----|
FOR | 0 |XXXXX| 46 |
CLINTON | 20 |XXXXX| 20 |
| 34 |XXXXX| 0 |
|____ |XXXXX|____ |
| 54 |XXXXX| 66 |
|(+8) |XXXXX|(+32)|
|-----|-----|-----|
FOR | 0 | 0 |XXXXX|
NADER | - | 0 |XXXXX|
| 34 | 34 |XXXXX|
|____ |____ |XXXXX|
| 34 | 34 |XXXXX|
|(-12)|(-32)|XXXXX|
|-----|-----|-----|
The following matrix explains how I would tally the truncated
vote which produces a circular tie. Dole is "least beaten" by 8
votes.
AGAINST:
|DOLE |CLINT|NADER|
|-----|-----|-----|
FOR |XXXXX| 46 | 46 |
DOLE |XXXXX| 0 | 10 |
|XXXXX| 0 | 0 |
|XXXXX|____ |____ |
|XXXXX| 46 | 56 |
|XXXXX|(-8) |(+12)|
|-----|-----|-----|
FOR | 0 |XXXXX| 23 |
CLINTON | 20 |XXXXX| 20 |
| 34 |XXXXX| 0 |
|____ |XXXXX|____ |
| 54 |XXXXX| 43 |
|(+8) |XXXXX|(-14)|
|-----|-----|-----|
FOR | 0 | 23 |XXXXX|
NADER | 10 | 0 |XXXXX|
| 34 | 34 |XXXXX|
|____ |____ |XXXXX|
| 44 | 57 |XXXXX|
|(-12)|(+14)|XXXXX|
|-----|-----|-----|
The following matrix explains how I think that you would tally
the truncated vote which produces a circular tie. Dole is also "least
beaten" by 8 votes.
AGAINST:
|DOLE |CLINT|NADER|
|-----|-----|-----|
FOR |XXXXX| 46 | 46 |
DOLE |XXXXX| 0 | - |
|XXXXX| 0 | 0 |
|XXXXX|____ |____ |
|XXXXX| 46 | 46 |
|XXXXX|(-8) |(+12)|
|-----|-----|-----|
FOR | 0 |XXXXX| - |
CLINTON | 20 |XXXXX| 20 |
| 34 |XXXXX| 0 |
|____ |XXXXX|____ |
| 54 |XXXXX| 20 |
|(+8) |XXXXX|(-14)|
|-----|-----|-----|
FOR | 0 | - |XXXXX|
NADER | - | 0 |XXXXX|
| 34 | 34 |XXXXX|
|____ |____ |XXXXX|
| 34 | 34 |XXXXX|
|(-12)|(+14)|XXXXX|
|-----|-----|-----|
__________________________________________
aa447 at FreeNet.Carleton.CA
http://www.igs.net/~lsaumur/
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