# Converting a formula into PHP

I'm trying to convert this adaptive bayesian rating formula into PHP code: see here.

Here are the details of the various parts of the formula..

• deltarank(k, m) : rank increment caused by kth vote that is casted to mth link.
• nsaves(i) : number of users that save ith link to their linkibol.
• a : save exponent (an ad-hoc value close to 1)
• age(i) : the difference (in days) between date link added and current date.
• b : decay exponent (an ad-hoc value close to 0)

(full details of the formula can be found at http://blog.linkibol.com/2010/05/07/how-to-build-a-popularity-algorithm-you-can-be-proud-of/ - scroll down to the "How Do We Implement Popularity in linkibol?" section)

I can convert most of this function into PHP code easily, but the bit I'm not understanding is the sigma and deltarank bit. I'm not sure what that bit is supposed to do or what values to pass to k and m.

If anyone has any tips or could break the complex bit of the formula down that'd be great, then I can look at what would be the best way to implement it in PHP - there might be functions I could make use of etc..

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Ones you get the algorithm code I would be interested in seeing what it looks like. –  Bot Oct 21 '10 at 21:10

They define the delta rank as the change in rank when the kth vote is cast on the mth link... it seems like that's arbitrary, since their rank change is based on the karma of the users casting the vote.

As for the sigma, it's just the sum of the contents from (k=1) to (k=whatever), so you'll implement that with a loop.

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I understand it's based on the karma, I'm just not sure what the parameters k and m represent (kth vote and mth link). Is the sigma bit affected by the deltarank bit? I know sigma doesn't have to increment 1 integer at a time, so I'm wondering if it's affected by the value returned by deltarank.. –  RichW Oct 21 '10 at 20:56
k and m are the current index in the loops - if you look at the initial values for the sigmas, one starts with k=1 and the other starts with m=1. And yes, a sigma like that does increment 1 integer at a time. –  Sam Dufel Oct 21 '10 at 21:07