# poker side pot algorithm

I'm trying to run a poker simulation and have the following data about a poker table: - how much each player contributed to the pot - a "hand score" (after flop) for each player (ie, if player[0].score == player[1].score, they tied)

I'm really stuck to calculate how much each player should win without needing to create sidepots and assigning players to each of them; but I'm pretty sure it's possible to do that without so.

A couple examples:

```1) player[0].contributed = 100
player[1].contributed = 80
player[2].contributed = 20
player[0].score = 10
player[1].score = 2
player[2].score = 10

total_pot = 200; (do I need to return player[0] exceeding 20 back now and remove it from the pot?)

so players 0 and 1 tied for first spot, player 2 lost
the answer should be (if I'm not mistaken):

```

thanks

-
I know it's not answering your question which is why I am commenting and not answering but depending on implementation generally I think it would be better practice to create the individual side pots, as it would be clearer code to have a representation of each fraction of the total that should be won, also I would imagine it makes it quicker to compute if the pot has to split –  zode64 Mar 28 '11 at 17:23

First sort by score descending, so you'll end up with two groups: { 0, 2 }, { 1 }.

Then, sort each group by the order they have contributed ascending: { 2 (20), 0 (100) }, { 1 (80) }.

Now, divide the pot in that order:

1. First you'll take (max) 20 away from each players contributions to create the first pot. And divide it evenly to 2 and 0. The first pot will be (20 + 20 + 20 = 60. So both 0 and 2 will be given 30). After that, the first players winnings are done, and you are left with: { 0 (80) }, { 1 (60) }.

2. Now, you'll take (max) 80 away from each players contributions to create the next pot (80 + 60 = 140). And give it to 0 (no division needed as there are no longer more than one in the top group, so 0 will receive the whole 140). You'll be left with: { 1 (0) }.

3. No more contributions left, so you are done.