So I have this university assignment to solve Sudoku... I read about Algorithm X and Dancing algorithm, but they didn't help me.

I need to make it with backtracking. I hard-coded some of the indexes in the two dimensional array with numbers on places given from Wikipedia (so I am sure that it's solvable).

The code I got is the following:

```
public void solveSudoku(int row, int col)
{
// clears the temporary storage array that is use to check if there are
// dublicates on the row/col
for (int k = 0; k < 9; k++)
{
dublicates[k] = 0;
}
// checks if the index is free and changes the input number by looping
// until suitable
if (available(row, col))
{
for (int i = 1; i < 10; i++)
{
if (checkIfDublicates(i) == true)
{
board[row][col] = i;
if (row == 8)
solveSudoku(0, col + 1);
else if (col == 8)
solveSudoku(row + 1, 0);
else
solveSudoku(row, col + 1);
board[row][col] = 0;
}
}
}
// goes to the next row/col
else
{
if (row == 8)
solveSudoku(0, col + 1);
else if (col == 8)
solveSudoku(row + 1, 0);
else
solveSudoku(row, col + 1);
}
}
/**
* Checks if the spot on the certain row-col index is free of element
*
* @param row
* @param col
* @return
*/
private boolean available(int row, int col)
{
if (board[row][col] != 0)
return false;
else
return true;
}
/**
* Checks if the number given is not already used in this row/col
*
* @param numberToCheck
* @return
*/
private boolean checkIfDublicates(int numberToCheck)
{
boolean temp = true;
for (int i = 0; i < dublicates.length; i++)
{
if (numberToCheck == dublicates[i])
{
temp = false;
return false;
}
else if (dublicates[i] == 0)
{
dublicates[i] = numberToCheck;
temp = true;
return true;
}
}
return temp;
}
```

I am getting StackOverflow on

```
// goes to the next row/col
else
{
if (row == 8)
solveSudoku(0, col + 1);
else if (col == 8)
solveSudoku(row + 1, 0);
else
solveSudoku(row, col + 1);
}
```

which means that I have to stop the recursion at some point, but I can't figure it out how!
If you find any other mistakes in the `solve()`

function - let me know. Because I am not sure I understand the "backtracking" thing completely...