# Devise Combinatorics Naming Convention

I stumbled upon a problem that I'm looking for an smart solution to. It's basically a combinatorics question.

I have five objects of which I need to select two, I can select the same one twice and it does not matter in which order I select them. This gives me ( 5 + 2 - 1 choose 2) = 15 possible combinations. I now want to reduce each combination (ie (1,1) or (2, 5)) to a number between 1 and 15. Any suggestions?

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Quasi lexicographic ordering. Assign each selection its position in the lexicographic ordering, with the second component not smaller than the first.

``````(i,j) -> (15 - (7-i)*(6-i)/2) + (j - i) + 1
``````
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Thanks! Thought there probably was a name for it. –  foges Jul 12 '12 at 0:54

Suppose you have a combination (i, j)

Without losing generality, say i <= j

``````((7-i)+5)*(i-1)/2 + (j-i+1)
``````

You'll have

(1, 1)->1 (2, 2)->6 (3, 3)->10 (4, 4)->13 (5, 5)->15

(1, 2)->2 (2, 3)->7 (3, 4)->11 (4, 5)->14

(1, 3)->3 (2, 4)->8 (3, 5)->12

(1, 4)->4 (2, 5)->9

(1, 5)->5

Basically you'll first have the number of combinations before column i, then plus (j-i+1) as the row number

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You can't assume `i < j`; the OP can select the same term twice. As well, this gives numbers beyond 15, e.g. `(i,j) = 4,5` gives 17, if my arithmetic is right. –  DSM Jul 11 '12 at 23:54
@DSM but the OP said the order doesn't matter –  xvatar Jul 11 '12 at 23:56
That order doesn't matter means that you can choose `i <= j`, not `i < j`, because the OP could select the same term twice (e.g. (4,4)). I still can't match your numbers, though. –  DSM Jul 11 '12 at 23:58
@DSM In OP's question, (3,4) and (4,3) are the same combination. In my formula, (i,j) and (j,i) denote the same thing, and I always use j to denote the larger number. –  xvatar Jul 12 '12 at 0:04
Let me try one last time: if i = 4, and j = 4, it is not true that `i < j`, because 4 = 4, not 4 < 4. You mean `i <= j`, not `i < j`. Second: take your formula, ((i+1)+5)*(i-1)/2 + (j-i+1). Put in i=4, j=5. You get 17, not 14. –  DSM Jul 12 '12 at 0:07
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