# Represent order of permutation using an integer?

Assume there's `N` (N=10) letters A, B, ..., J. String `S` is an instance of the permutation.

I want to store the order of permutation by a 32-bit integer `p`, and to convert between the String `S` and the order `p`, and to validate the integer value, I have written something like this:

``````int S2P(char *s) {
unsigned int p = 0;
char c;
while (c = *s++) {
c -= 'A';
p *= 10;
p += c;
}
return p;
}

char *P2S(unsigned int p, char *buf) {
char *s = buf + 10;
char used[20], *t;
int i, j, c;
strcpy(used, "ABCDEFGHIJ");
*s-- = '\0';
for (i = 1; i < 10; i++) {
*s-- = c = 'A' + (p % 10);
p /= 10;
t = strchr(used, c);
if (t)
*t = '-';
}
for (i = 0; i < 10; i++)
if (used[i] != '-')
*s = used[i];
return buf;
}

int PCheck(int p) {
char tmp[20];
int q = S2P(P2S(p, tmp));
return p == q;
}
``````

It's working not so efficient. That means,

1. It's not possible to add one more letter. (max(N) = 10)
2. In `P2S`, an extra lookup table is used, to find out the 10th letter.
3. `PCheck(int)` is too slow.

How to make it better? A straight piece of code is appreciated.

-
What do you mean by "working but buggy"? If it's buggy then I wouldn't say it's working. I think you should describe your algorithm rather than post code, that would make it easier for more people to help you. –  IVlad Jan 4 '11 at 18:02

Is there any better algorithm?

Check out Knuth's TAOCP Volume 4 Fascicle 2, Generating All Tuples and Permutations (I think it will be out in physical book form very soon, though). He addresses this problem there.

-
Is that fascicle up for download at that site? Because I can't find it. –  IVlad Jan 4 '11 at 18:00
@IVlad: Try the pre-fascicle 2B on this page: cs.utsa.edu/~wagner/knuth, or you can buy a copy of the full fascicle here: amazon.com/Art-Computer-Programming-Fascicle-Permutations/dp/… (or probably get a copy from your local library). –  Jason Jan 4 '11 at 19:57
I think you are interested in the factoradic. This allows you to find what the `n`th lexicographic permutation of `0 1 ... n - 1` is and what position a given permutation of the same set has in the lexicographic ordering of all permutations, and it's also efficient.