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I am creating all possible permutations of a set, say {1,2,3}, given that I can choose two numbers every time. I understand that this can be done using permutations function but my list can be very big and after creation of such a huge matrix it would take too long to do any operations on it. Hence, I wrote the following recursive function that does what I want:

h=Table[Null,{}]    
myset = {1, 2, 3};
numOfBins = 2;
h=Table[Null,{numOfBins}];
rec[x_] := (
   If[
    x <= numOfBins,
    Do[
     h[[x]] = j; 
     rec[x + 1],
     {j, 1, Length[myset]}
     ],
    Print[h]
    ]
   );
rec[1]

The outcome of the this code is:

{1,1}
{1,2}
{1,3}
{2,1}
{2,2}
{2,3}
{3,1}
{3,2} 
{3,3}

Now I would like to know how can I do this using functional programming maybe with Nest or NestWhile...

share|improve this question
    
Wouldn't the matrix be same huge regardless of how you make it ? –  b.gatessucks Nov 1 '12 at 15:18
    
I am not a pro but some how using the recursive function is faster. –  a.a Nov 1 '12 at 19:52

1 Answer 1

If you request only those permutations of length 2, Mathematica can return the result rather quickly.

AbsoluteTiming[Permutations[Range[500], {2}]]

permutations of length2

Mathematica does not first generate all permutations and then select those of length 2. It cannot even handle the task of finding all permutations of a list of 500 items.

Permutations[Range[500]]

all permutations

share|improve this answer
    
well my problem is not limited to two, it may increase to 7 or 10 and this is a procedure that can repeat as well. –  a.a Nov 3 '12 at 8:32
    
I see. Let me think a bit a bit about this. –  David Carraher Nov 3 '12 at 11:21

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