# assigning all combinations of a variable number of variable objects

I'm having difficulty with this recursion problem. I thought I had an answer to it but it doesn't work, and I simply don't know why, so I thought I would ask the experts. Please go easy on me, I took C programming more than 15 years ago and even then I was maybe a B student. I don't know C++ or Java.

The purpose is to generate all of the possible combinations of integers from 0 to (n[j]-1), where j can be an arbitrary integer. Right now it is hard-coded as 2, but I would like it to be able to take any value eventually.

Edit: For the code below, I define 2 sequences, with the 0th sequence having a length of 2 (0,1) and the 1st sequence having a length of 3 (0, 1, 2). The desired output is as follows:

``````p[0][0] = 0
p[0][1] = 0
p[1][0] = 0
p[1][1] = 1
p[2][0] = 0
p[2][1] = 2
p[3][0] = 1
p[3][1] = 0
p[4][0] = 1
p[4][1] = 1
p[5][0] = 1
p[5][1] = 2
``````

That is,

• the 0th combination contributes 0 from sequence 0 and 0 from sequence 1
• the 1st combination contributes 0 from sequence 0 and 1 from sequence 1
• the 2nd combination contributes 0 from sequence 0 and 2 from sequence 1
• the 3rd combination contributes 1 from sequence 0 and 0 from sequence 1
• the 4th combination contributes 1 from sequence 0 and 1 from sequence 1
• the 5th combination contributes 1 from sequence 0 and 2 from sequence 1

I hope this makes it clearer what I'm trying to do!

``````#include <stdio.h>
#include <stdlib.h>

int recurse (int **p, int *n, int nclass, int classcount, int combcount);

int recurse (int **p, int *n, int nclass, int classcount, int combcount)
{
int k, j, kmax;
kmax = n[classcount];
j = classcount;

if (j == nclass)  {
return (combcount+1);
}

for (k = 0; k < kmax; k++)  {
p[combcount][j] = k;
combcount = recurse (p, n, nclass, j+1, combcount);
}
}

int main (void)
{
int **p, n[2], i, j;

n[0] = 2;
n[1] = 3;

p = (int **) malloc ((n[0]*n[1]) * sizeof (int *));
for (i = 0; i < (n[0]*n[1]); i++)  {
p[i] = (int *) malloc (2 * sizeof (int));
for (j = 0; j < 2; j++)
p[i][j] = -1;
}

/* p[i][j] = the value of the integer in the ith combination
arising from the sequence 0...n[j]-1 */

recurse (p, n, 2, 0, 0);

for (i = 0; i < (n[0]*n[1]); i++)
for (j = 0; j < 2; j++)
printf ("%d %d: %d\n", i, j, p[i][j]);

for (i = 0; i < (n[0]*n[1]); i++)
free (p[i]);
free (p);
return (0);
}
``````
-
It's not quite clear what you need. Correct me if I'm wrong. You're given an array of integers `n` of size N. For each of its elements `n[j]` you should generate an `(n[j]!)` by `(n[j])` matrix `P[j]` of all permutations of sequence `(0 ... n[j]-1)`. Each row of the matrix stores one permutation. – Alexander Bakulin May 25 '12 at 6:49
I also find your question a bit unclear, maybe you could walk us through an example? – CyberSpock May 25 '12 at 7:27
I edited the description for clarification, sorry for not being clear initially. – user1416583 May 25 '12 at 13:29

``````#include <stdio.h>
#include <stdlib.h>

void recurse(int *n, int *accum, int **p, int N, int k) {
static int comb;
int i, j;
if (k == 0)
comb = 0;
if (k == N) {
for (i = 0; i < N; ++i)
p[comb][i] = accum[i];
comb++;
}
else
for (i = 0; i < n[k]; ++i) {
accum[k] = i;
recurse(n, accum, p, N, k+1);
}
}

int main(void) {
const int N = 2;
int n[N];
int accum[N];
int **p;
int mult;
int i, j;
n[0] = 2;
n[1] = 3;
for (mult = 1, i = 0; i < N; mult *= n[i], ++i);
p = malloc(mult*sizeof(int*));
for (i = 0; i < mult; i++)
p[i] = malloc(N*sizeof(int));
recurse(n, accum, p, N, 0);
for (i = 0; i < mult; ++i)
for (j = 0; j < N; ++j)
printf("p[%d][%d] = %d\n", i, j, p[i][j]);
for (i = 0; i < mult; i++)
free(p[i]);
free(p);
}
``````
-
Hi Alexander, thanks for your response. Your code appears to construct the 6 permutations of the sequence (0,1,2) like BLUEPIXY's code below but with matrices. I am not sure how this fits to my particular problem. Is there any further insight you could provide? Thanks! – user1416583 May 25 '12 at 13:27
Updated according to your clarifications. – Alexander Bakulin May 25 '12 at 14:10
Wow, that is terrific. Thank you. I am not sure how it works but I will have to analyze it to see. – user1416583 May 25 '12 at 14:39
``````#include <stdio.h>
#include <stdlib.h>

int recurse (int **p, int *n, int nclass, int classcount, int p_size){
int i, j, jmax, k, kmax;

if (classcount == nclass) return 1;

i = 0;
kmax = n[classcount];
while(i < p_size){
for (k = 0; k < kmax; ++k){
jmax = recurse (p, n, nclass, classcount+1, p_size);
for(j = 0;j < jmax; ++j)
p[i++][classcount] = k;
}
}
return kmax*jmax;
}

int main (void){
int **p, n[2], i, j;
int sizeAll, sizeN;

n[0] = 2;
n[1] = 3;
sizeAll = n[0]*n[1];
sizeN = sizeof(n)/sizeof(int);
p = (int **) malloc (sizeAll * sizeof (int *));
for (i = 0; i < sizeAll; ++i) {
p[i] = (int *) malloc (sizeN * sizeof (int));
for (j = 0; j < sizeN; ++j)
p[i][j] = -1;
}

recurse (p, n, sizeN, 0, sizeAll);

for (i = 0; i < sizeAll; ++i)
for (j = 0; j < sizeN; ++j)
printf ("%d %d: %d\n", i, j, p[i][j]);

for (i = 0; i < sizeAll; ++i)
free (p[i]);
free (p);
return (0);
}
``````
-
Hi, Thank you for your response. I ran your code and it seems to construct the 6 permutations of the sequence (0, 1, 2). But I am not sure how to adapt this code to my particular problem. Could you give me a couple more pointers (no pun intended)? – user1416583 May 25 '12 at 13:26
@user1416583 - rewrite program.. – BLUEPIXY May 25 '12 at 15:09