# Algorithm to find all permutations of a given N with condition

I am designing a program to print all permutations of a given N such that the each digit should be greater than the next digit.

For Example if N=3: output should be 123,456,789,134,145,178,189 etc...

Initial Design:

1. Generate all possible permutations

2. Pass the generated permutation to a digit extraction function which checks for the condition

3. Print out the result

This is a very naive algorithm. But I do not know the implementation/initial design because of the dynamic size of N.

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Is what you want the set of all N-digit decimal numbers for which the digits are distinct and increasing? –  Ted Hopp Nov 22 '11 at 5:34
@TedHopp Yes..N is the given input to the function... –  thinkcool Nov 22 '11 at 5:38
Recursion will do... –  st0le Nov 22 '11 at 5:45

Since N will always be less than 10, i've used recursion

Call the function as `f(3,0,0)`

``````public static void f(int N,int digit,int num)
{
if(N > 0 )
{
for(int d = digit + 1; d < 11 - N; d++) // earlier d < 10, see comments
{
f(N-1,d,num * 10 + d);
}
}else {
System.out.println(num); //add it to a list or whatever
}
}
``````

Output:

``````123
124
...
678
679
689
789
``````
-
+1 Nicely done. A lot of useless work (particularly for large N) can be avoided by replacing `d < 10` in the `for` loop with `d < 11 - N`. –  Ted Hopp Nov 22 '11 at 14:44
@TedHopp, Excellent. Edited. –  st0le Nov 23 '11 at 3:44

The most straightforward way to do this is with recursion. Suppose you've generated the first n digits and the last digit generated is i. You have N - n digits left to generate and they must start with i + 1 or higher. Since the last digit can be no more than 9, the next digit can be no more than 10 - (N - n). This gives the basic rule for recursion. Something like this (in Java) should work:

``````void generate(int N) {
int[] generated = new int[N];
generate(generated, 0);
}

void generate(int[] generated, int nGenerated) {
if (nGenerated == generated.length) {
// print the generated digits
for (int g : generated) {
System.out.print(g);
}
System.out.println();
return;
}
int max = 10 - (generated.length - nGenerated);
int min = nGenerated == 0 ? 1 : (generated[nGenerated - 1] + 1);
for (int i = min; i <= max; ++i) {
generated[nGenerated] = i;
generate(generated, nGenerated + 1);
}
}
``````
-

Just generate them in lexicographic order:

``````123
124
125
...
134
135
...
145
...
234
235
...
245
...
345
``````

This assumes you have digits at most 5. For larger bound `B`, just keep going. Some simple code to do this is:

``````nextW = w;
for (int i=n-1; i>=0; --i) {
// THE LARGEST THE iTH DIGIT CAN BE IS B-(n-i-1)
// OTHERWISE YOU CANNOT KEEP INCREASING AFTERWARDS
// WITHOUT USING A NUMBER LARGER THAN B
if w[i]<B-(n-i-1) {
// INCREMENT THE RIGHTMOST POSITION YOU CAN
nextW[i] = w[i]+1;
// MAKE THE SEQUENCE FROM THERE INCREASE BY 1
for (int j=i+1; j<N; ++j) {
nextW[j] = w[i]+j-i+1;
}
// VOILA
return nextW;
}
}
return NULL;
``````

Start with `w = [1,2,3,...,N];` (easy to make with a `for` loop), print `w`, call the function above with `w` as an input, print that, and continue. With `N = 3` and `B = 5`, the answer will be the above list (without the ... lines).

If there is no bound `B`, then you're SOL because there are infinitely many.

In general, you are computing the `N`th elementary symmetric function `e_N`.

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Can you explain your answer? Thanks.. –  thinkcool Nov 22 '11 at 5:47
@thinkcool See above. If it's unclear, please let me know which part is troublesome. –  PengOne Nov 22 '11 at 5:57
nextW = w; what does w contain initially? –  thinkcool Nov 22 '11 at 6:05
Start with `w = [1,2,3,...,N]`, then generate the next one in lexicographic order with the function described above, which takes `w` as an input. –  PengOne Nov 22 '11 at 6:08
I think we do not need B, since we need to just print all the three digit numbers.. –  thinkcool Nov 22 '11 at 6:13