# N Queen Placement Algorithm

I was solving the N Queen problem where we need to place N queens on a N X N chess board such that no two queens can attack each other.

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

int size=8;
char arr[8][8];
int i,j;

void initializeBoard()
{
for(i=0;i<size;i++)
{
for(j=0;j<size;j++)
{
arr[i][j]='.';
}
}
}

void printArray()
{

for(i=0;i<size;i++)
{

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

printf("\n");
}
printf("\n\n");
}

void placeQueen(int i,int j)
{
arr[i][j]='Q';
}

int isAvailable(int i,int j)
{
int m,n,flag;

for(m=0;m<i;m++)
{
for(n=0;n<size;n++)
{
int k=abs(i-m);
int l=abs(j-n);

if(arr[m][j]!='Q' && arr[k][l]!='Q')
{
flag=1;
}

else
{
flag=0;
break;
}
}
}
return flag;

}

int main(void)
{
initializeBoard();

for(i=0;i<size;i++)
{
for(j=0;j<size;j++)
{
if(isAvailable(i,j)==1)
{
// means that particular position is available
// and so we place the queen there

placeQueen(i,j);
break;
}
}
}

printArray();
return 0;
}
``````

I think the problem is with the isAvailable() method. However, I am not able to find the bug. Please help me identify it.

Is the approach that i am taking involves backtracking ? If not, please provide the same with some explanations

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Not explaining what the bug/problem is makes it really hard for someone to answer the question. –  Gordon Linoff Jul 13 '12 at 18:51
I remember this was a programming problem for a competition, perhaps mark this as homework to draw more interest? –  ardentsonata Jul 13 '12 at 19:00
That isAvailable function looks extremely broken. –  airza Jul 13 '12 at 19:02
Yes, it's definitely broken. For instance, if the parameter `i` is 0, then the `for` loop is never entered and it returns an uninitialized `flag` value. –  Kevin Jul 13 '12 at 19:04
It is not possible to solve your problem for `N` = 2 –  Sam I am Jul 13 '12 at 20:59

Your approach does not backtrack. It iterates over some possibilities, not all. This problems is best solved recursively, so I wouldn't do it as you are doing. You have to define the rules for a Queen being attacked by other. You do it using `ifs`, and recursion to apply the rule again and to iterate. Most of the backtracking algorithms are written recursively. I will give you an answer, so you can base yours on mine.

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

int count = 0;
void solve(int n, int col, int *hist)
{
int i, j;
if (col == n) {
printf("\nNo. %d\n-----\n", ++count);
for (i = 0; i < n; i++, putchar('\n'))
for (j = 0; j < n; j++)
putchar(j == hist[i] ? 'Q' : ((i + j) & 1) ? ' ' : '.');

return;
}

#   define attack(i, j) (hist[j] == i || abs(hist[j] - i) == col - j)
for (int i = 0, j = 0; i < n; i++) {
for (j = 0; j < col && !attack(i, j); j++);
if (j < col) continue;

hist[col] = i;
solve(n, col + 1, hist);
}
}

int main(int n, char **argv)
{
if (n <= 1 || (n = atoi(argv[1])) <= 0) n = 8;
int hist[n];
solve(n, 0, hist);
}
``````

The way backtracking works in the following:

1. create a constraint (a rule) to check if the conditions are meet.
2. Consider the problem as a search tree. The time spent to search this tree is based on `n`, the size of the board. The best way to search is recursively, so have in mind, the smart way to solve is using recursion.
3. In that code, the first set of `for` loops just prints the board out, and checks if `Q` if found.
4. `# define attack(i, j) (hist[j] == i || abs(hist[j] - i) == col - j)` is my rule, which asserts 2 queens are not attacking each other.
5. The second set of `for` loops finds a condition which another queen can be inserted, within the constraint rules.
6. Then I call find function again. That's how the backtracking is done.
7. My base case is that 2 queens can be on the board, then I'm going recursively check if another queen can be added until 8. Thus, 2 + 1 = (1+1) + 1 = 1 (1 + 1). Applying the rule again, we have 3 + 1 = (2) + 1 + 1 = (2) + (1 + 1), and again 4 = (3) + 1 + 1 = (3) + (1+1).
8. Recursion does that for you. Let out apply the rule over and over. So `f(n+1) = f(n) + 1` for that case and `f(2) = 2` is my base case.
9. The base of backtracking is if one of those branches don't work out, you can go one level up and search another branch, and so on, until the tree is all searched out. Again, recursion is the way to go.
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Can you please explain your code, i really want to understand how backtracking is implemented in code. Please !! –  OneMoreError Jul 13 '12 at 19:02
@CSSS I post the best answer I could –  philippe Jul 13 '12 at 19:31

Having done this problem before, not all placements will allow for a valid solution to the problem.

Your solution involves always placing a queen at position (0,0) which will always be available.

You will need to either involve backtracking whenever you go through everything and can't find anything, or you will need to rely on a solution that places all queen's randomly and checking for a solution then (this method is actually much faster than you would think, but at the same time, random therefore very inefficient in the average case)

a potential pseudo solution:

``````while(!AllQueensPlaced){
for(going through the array ){
if(isAvailable())
{
placeQueen();
lastQueenPlaced = some logical location of last queen;
}
}
if(!AllQueensPlaced)
{
backtrack(lastQueenPlaced);
}
}
``````

Your backtrack method should mark the lastQueenPlaced as dirty and traverse through the array again looking for a new location, and then go through the while loop again. don't forget to change lastQueenPlaced in backtrack() in case that is also a lastQueenPlaced.

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