# Difference between revisions of "Instant Runoff Normalized Ratings"

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* Divide each rating by the square root of the sum of the squared ratings. The vote will then be a vector with magnitude equal to 1. |
* Divide each rating by the square root of the sum of the squared ratings. The vote will then be a vector with magnitude equal to 1. |
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This shall be called IRNR[2] since the normalization factor is the L2 norm. |
This shall be called IRNR[2] since the normalization factor is the L2 norm. |
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− | * One could more generally consider IRNR[p] for any fixed real p with |
+ | * One could more generally consider IRNR[p], based on the Lp norm, for any fixed real p with |

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+ | 1<=p<=infinity. |
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Sum up the normalized ratings for each candidate. If there are two choices, the highest rated is the winner. If there are more than two choices, disqualify the lowest rated choice. |
Sum up the normalized ratings for each candidate. If there are two choices, the highest rated is the winner. If there are more than two choices, disqualify the lowest rated choice. |

## Revision as of 15:20, 14 October 2005

Based on a ratings ballot, IRNR seeks to give every voter equal power and encourage honest ratings.

The first step is normalizing, which can happen in two ways.

- Divide each rating by the sum of the absolute values of the ratings. The sum of the absolute values of the ratings will then be 1.

This shall be called IRNR[1] since the normalization factor is the L1 norm.

- Divide each rating by the square root of the sum of the squared ratings. The vote will then be a vector with magnitude equal to 1.

This shall be called IRNR[2] since the normalization factor is the L2 norm.

- One could more generally consider IRNR[p], based on the Lp norm, for any fixed real p with

1<=p<=infinity.

Sum up the normalized ratings for each candidate. If there are two choices, the highest rated is the winner. If there are more than two choices, disqualify the lowest rated choice.

The process repeats with a normalization step that ignores disqualified choices. A voter's voting power is thus redistributed among the remaining choices.

Unfortunately usually the best strategy in IRNR[p] is simply to (strategically) plurality-vote, i.e. giving all candidates except one a rating of zero. This is true whenever there are two "frontrunner" candidates judged to be far more likely to win than the others and p is finite. (Then vote for the best among these two.) If p is infinite IRNR just becomes equivalent to range voting in the range [-1, 1] with an extra rule demanding that the best- or worst-rated candidate must have a rating with absolute value 1.