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I want an algorithm to generate all possible N-digit numbers, whose digits are in increasing order.

e.g.: if N=3, then possible numbers are: 012,123,234,246,567,259, because:

0<1<2

...

2<5<9

etc.

How can I do it?

I developed the following algorithm but it only generates the numbers with consecutive increasing digits like 123,234,345,456,567, etc.. Hence, a large set of numbers is missed out.

private static void generate(int start,int n)
{
    if((start+n)>9)
        return;
    else
    {
        for(int i=0;i<n;i++)
            System.out.print(start+i);

        System.out.println();
        generate(start+1,n);
     }
}
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6  
Try breaking the problem to a set of smaller problems. For instance, you need to generate 10-digit numbers. Can you get your set your answer if you already have 9-digit numbers solved? What about 5-digit numbers? –  n.m. Oct 23 '13 at 11:02

2 Answers 2

up vote 5 down vote accepted

Trying to preserve your original idea:

private static void generate(int prefix, int start, int n)
    {
        if (n == 0)
        {
            System.out.print(prefix);
            System.out.println();
        }
        else
        {
            for(int i=start;i<10;i++)
                generate(10*prefix+i, i+1, n-1);
        }
    }
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Nice and simple, well done! –  DDW Oct 23 '13 at 11:15
    
System.out.print(prefix); System.out.println(); can be just System.out.println(prefix); –  BartoszKP Oct 23 '13 at 11:29
    
@BartoszKP the OP didn't mention any programming language, so I assumed just pseudo code. –  Henrik Oct 23 '13 at 11:31
    
@Henrik Sorry if my edit was too much. But it's not pseudo code - it's clearly Java :) So I added the language directive so it's easier to read. –  BartoszKP Oct 23 '13 at 11:34
    
@Henrik:Well done –  Insane Coder Oct 23 '13 at 11:36

From a more declarative angle the algorithm would look almost like mathematical notation (in Haskell):

generate = toInt [[a,b,c] | a <- x, b <- x, c <- x, a < b, b < c]
  where x = [0..9]
        toInt = map (foldl (\n m -> 10*n + m) 0) 

where map (foldl (\n m -> 10*n + m) 0) just translates a list of digits to an integer and there rest is kind of self-documenting: take three digits whilst obeying to a given constraint.

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