# All possible solution of the n-Queen's algorithm

When implementing an algorithm for all possible solution of an n-Queen problem, i found that the same solution is reached by many branches. Is there any good way to generate every unique solutions to the n-Queens problem? How to avoid the duplicate solutions generated by the different branches (except store and compare)?

Here is what i have tried, for the first solution: http://www.ideone.com/hDpr3

Code:

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

/* crude */

#define QUEEN 'Q'
#define BLANK '.'

int is_valid (char **board, int n, int a, int b)
{
int i, j;

for (i=0; i<n; i++)
{
if (board[a][i] == QUEEN)
return 0;
if (board[i][b] == QUEEN)
return 0;
}

for (i=a, j=b; (i>=0) && (j>=0); i--, j--)
{
if (board[i][j] == QUEEN)
return 0;
}

for (i=a, j=b; (i<n) && (j<n); i++, j++)
{
if (board[i][j] == QUEEN)
return 0;
}

for (i=a, j=b; (i>=0) && (j<n); i--, j++)
{
if (board[i][j] == QUEEN)
return 0;
}

for (i=a, j=b; (i<n) && (j>=0); i++, j--)
{
if (board[i][j] == QUEEN)
return 0;
}
return 1;
}

void show_board (char **board, int n)
{
int i, j;

for (i=0; i<n; i++)
{
printf ("\n");
for (j=0; j<n; j++)
{
printf (" %c", board[i][j]);
}
}
}

int nqdfs_all (char **board, int n, int d)
{
int i, j, ret = 0;

/* the last queen was placed on the last depth
* therefore this dfs branch in the recursion
* tree is a solution, return 1
*/
if (d == n)
{
/* Print whenever we find one solution */
printf ("\n");
show_board (board, n);
return 1;
}

/* check all position */
for (i=0; i<n; i++)
{
for (j=0; j<n; j++)
{
if (is_valid (board, n, i, j))
{
board[i][j] = QUEEN;
nqdfs_all (board, n, d + 1);
board[i][j] = BLANK;
}
}
}

return ret;
}

int nqdfs_first (char **board, int n, int d)
{
int i, j, ret = 0;

/* the last queen was placed on the last depth
* therefore this dfs branch in the recursion
* tree is a solution, return 1
*/
if (d == n)
return 1;

/* check all position */
for (i=0; i<n; i++)
{
for (j=0; j<n; j++)
{
if (is_valid (board, n, i, j))
{
board[i][j] = QUEEN;
ret = nqdfs_first (board, n, d + 1);
if (ret)
{
/* if the first branch is found, tell about its
* success to its parent, we will not look in other
* solutions in this function.
*/
return ret;
}
else
{
/* this was not a successful path, so replace the
* queen with a blank, and prepare board for next
* pass
*/
board[i][j] = BLANK;
}
}
}
}

return ret;
}

int main (void)
{
char **board;
int n, i, j, ret;

printf ("\nEnter \"n\": ");
scanf ("%d", &n);

board = malloc (sizeof (char *) * n);
for (i=0; i<n; i++)
{
board[i] = malloc (sizeof (char) * n);
memset (board[i], BLANK, n * sizeof (char));
}

nqdfs_first (board, n, 0);
show_board (board, n);

printf ("\n");
return 0;
}
``````

To generate all possible solution i have used the same code `nqdfs_all ()` function, but did not return the control to the parent, instead continued enumerating and checking. A call to this function displays the duplicate results reached by different branches.

-
each solution has permutations and rotations that are equivalent. you could for instance rotate each solution and store/compare to the existing set. (does not really reduce your computation time - which is what you are after i assume... –  Randy Oct 11 '11 at 18:05

You should make use of the fact that each queen must be placed in a different column. If you have placed already k queens in the first k columns, recursively place queen number k+1 in column k+1 and go through rows 1 to n (and not through all n*n cells, as you algo currently does). Continue with k:=k+1 for each valid placement. That will avoid any duplicate results, since this algo does not generate any duplicate boards at all.

EDIT: to your question about avoiding of symmetries: a part of those can be avoided beforehand, for example, by restricting queen 1 in column 1 to rows 1,...`n/2`. If you want to avoid the output of symmetric solutions completely, you will have to store every found solution in a list and whenever you find a new solution, before printing it out, test if one of it's symmetric equivalents is already there in the list.

To make this more efficient, you can work with a "canoncial representation" of each board, defined as follows. Generate all symmetric boards of a given one, pack each one of it into a byte array, and among those arrays keep the array which, interpreted as a big number, has the minimum value. This packed represention is a unique identifier of the symmetry class of each board and can be easily put in a dictionary / hash table, which makes testing if that symmetry class already appeared very efficient.

-
Although, it will not remove symmetric equivalents (due to rotation or reflection). –  comingstorm Oct 11 '11 at 18:10
@comingstorm: true, but that was not the question of the OP. –  Doc Brown Oct 11 '11 at 18:12
although it is not the question but how could the reflection, rotation similar solutions be identified ? –  phoxis Oct 11 '11 at 18:36
@phoxis: see my edit –  Doc Brown Oct 11 '11 at 18:51
@DocBrown Thanks for the edit. I thought about a similar approach, completely avoiding symmetric solutions looks a bit difficult, better try hashing a board with symmetric similar boards having the same value. –  phoxis Oct 12 '11 at 11:59