# How can I improve this equation so items with more negative votes than positive return a more useful Wilson Score

Using the Wilson Score equation described here http://www.evanmiller.org/how-not-to-sort-by-average-rating.html , I am sorting my rated items. However, if an item has 1 negative vote (and 0 positive votes), it returns the same score (that being a score of 0) as an item with 1000 negative votes (and 0 positive).

I'd like to either allow a negative Wilson Score, to overcome this shortcoming, or perhaps another solution someone may suggest.

Either way, I am not sure how to alter this equation/function:

``````def ci_lower_bound(pos, n, confidence):
if n==0: return 0

z = 1.96
phat = 1.0*pos/n

score = (phat + z*z/(2*n) - z*math.sqrt((phat*(1-phat)+z*z/(4*n))/n))/(1+z*z/n)
return score
``````

where `pos` is the number of positive ratings, `n` is the total number of ratings, `confidence` refers to the statistical confidence level.

-
Do you know the number of positive and negative scores or just the total? –  Ben Apr 21 '12 at 13:40
@Ben yes, I have total, positive, and negative scores –  Raj Apr 21 '12 at 13:53

Logically, your scoring system has to deal with the following situations:

```+----------+----------+------------+---------------+
| Positive | Negative | Any Votes? | Wilson Score? |
+----------+----------+------------+---------------+
| N        | N        | N          | Y, = 0        |
| Y        | Y        | Y          | Y             |
| Y        | N        | Y          | Y             |
| N        | Y        | Y          | N             |
+----------+----------+------------+---------------+
```

The missing item being when you have 0 positive votes and more than 0 negative votes, as you note.

As you have both positive and negative scores at the time, why not follow your own idea and create a negative Wilson Score to deal with this, remembering that the square root of a negative number is complex.

To get around complexity assume that negative votes are positive. You then calculate how "liked" a negatively scored item is and multiple this by -1 to turn it into how disliked it is.

``````import math

def ci_lower_bound(pos, n, neg=0):

if n == 0:
return 0

# Cannot calculate the square-root of a negative number
if pos == 0:
else:

# Confidence
z = 1.96

phat = 1.0 * votes / n

# Calculate how confident we are that this is bad or good.
score = (phat + z*z/(2*n) - z * math.sqrt((phat*(1-phat)+z*z/(4*n))/n))/(1+z*z/n)

# This relationship is defined above.
# Multiply by -1 to return a negative confidence.
if use_neg:
return -1 * score

return score
``````
-
what I've noticed is if there are more negative than positive votes, my original equation returns a `score` of 0. So the problem isn't only when there are 0 positive votes. –  Raj Apr 21 '12 at 15:18
@Raj, you're meant to pass into the function the total number of positive votes and the total number of votes. Not the combined total! As long as there's 1 positive vote this should not return 0. –  Ben Apr 21 '12 at 15:20
I wasn't suggesting to pass in the sum of positive and total votes. That makes no sense! :) What I'm saying is, with my original function (in the original question), I noticed that if any item had more negative votes than positive, the item ended up with a score of 0. And it didn't seem the solution you posted would prevent that. Am I correct? –  Raj Apr 21 '12 at 15:28
What numbers are you passing in to get such a result? I'm fairly confident that it's impossible. Simplifying if you have more than one positive vote the square-root must be a positive number. Unless `phat + z * z / ( 2 * n )` is exactly equal to the sqrt ( highly unlikely ), you shouldn't get 0 if you have one or more positive votes. –  Ben Apr 21 '12 at 15:39
sorry, what I described is not the case, I was mistaken. However, with your code, 1 upvote and 1 downvote gives a score of -0.09452865480086611. Does that seem okay? –  Raj Apr 21 '12 at 17:26

Well, you could always sort by the tuple `(wilsonscore, -negative_votes)`, because of the way python sorts tuples. Python never considers the negative_votes, except for when the wilsonscore is identical. See:

``````>>> sorted([(0,-4000),(1,-4000),(0,-1),(1,-1)])
[(0, -4000), (0, -1), (1, -4000), (1, -1)]
``````

pro: simple solution to the problem, no need to alter the function, and very few need to alter code at all (since tuples behave "natural" when sorted).

cons: need to keep track of negative votes.

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I am returning a `rating` variable from `ci_lower_bound()`. And then this variable is used in a very complicated sorting method that sorts by multiple sortkeys in quite a complicated fashion. Without making significant changes to the code, I would not be able to implement this, and therefore just need the `rating` number itself to reflect an item's position in the sorting order. –  Raj Apr 21 '12 at 12:42