I'm having trouble understanding backtracking, I can conceptually understand that we make a move, then if no solutions can be found out of it we try the next solution.

With this in mind I'm trying to solve the N Queens problem, I'm finding out all the possible candidates that can be placed in the next row and then trying them one by one, if a candidate doesn't yield a solution, I pop it off and go with the next one.

This is core of the code that I have come up with :

```
void n_queens(int n)
{
vector<int> queens = vector<int>();
backtrack(queens,0,n);
}
void backtrack(vector<int>& queens, int current_row, int N)
{
// check if the configuration is solved
if(is_solution(queens, N))
{
print_solution(queens,N);
}
else
{
// construct a vector of valid candidates
vector<int> candidates = vector<int>();
if(construct_candidates(queens,current_row,N,candidates))
{
for(int i=0; i < candidates.size(); ++i)
{
// Push this in the partial solution and move further
queens.push_back(candidates[i]);
backtrack(queens,current_row + 1,N);
// If no feasible solution was found then we ought to remove this and try the next one
queens.pop_back();
}
}
}
}
bool construct_candidates(const vector<int>& queens, int row, int N, vector<int>& candidates)
{
// Returns false if there are no possible candidates, we must follow a different
// branch if this so happens
for(int i=0; i<N; ++i)
{
if(is_safe_square(queens,row,i,N))
{
// Add a valid candidate, this can be done since we pass candidates by reference
candidates.push_back(i);
}
}
return candidates.size() > 0;
}
```

It doesn't print anything for any input that I give it. I tried running it through `gdb`

but with no success, I think that is because there is a problem with my fundamental understanding of backtracking.

I have read up about backtracking in a couple of books and also an online tutorial and I still feel hazy, it'd be nice if someone could give me ideas to approach this and help me understand this slightly unintuitive concept.

The entire compilable source code is :

```
#include <iostream>
#include <vector>
#include <cmath>
using namespace std;
// The method prototypes
void n_queens(int n);
void backtrack(vector<int>&, int current_row, int N);
bool construct_candidates(const vector<int>&, int row, int N, vector<int>&);
bool is_safe_square(const vector<int>&, int row, int col, int N);
bool is_solution(const vector<int>&, int N);
void print_solution(const vector<int>&, int N);
int main()
{
int n;
cin>>n;
n_queens(n);
return 0;
}
void n_queens(int n)
{
vector<int> queens = vector<int>();
backtrack(queens,0,n);
}
void backtrack(vector<int>& queens, int current_row, int N)
{
// check if the configuration is solved
if(is_solution(queens, N))
{
print_solution(queens,N);
}
else
{
// construct a vector of valid candidates
vector<int> candidates = vector<int>();
if(construct_candidates(queens,current_row,N,candidates))
{
for(int i=0; i < candidates.size(); ++i)
{
// Push this in the partial solution and move further
queens.push_back(candidates[i]);
backtrack(queens,current_row + 1,N);
// If no feasible solution was found then we ought to remove this and try the next one
queens.pop_back();
}
}
}
}
bool construct_candidates(const vector<int>& queens, int row, int N, vector<int>& candidates)
{
// Returns false if there are no possible candidates, we must follow a different
// branch if this so happens
for(int i=0; i<N; ++i)
{
if(is_safe_square(queens,row,i,N))
{
// Add a valid candidate, this can be done since we pass candidates by reference
candidates.push_back(i);
}
}
return candidates.size() > 0;
}
bool is_safe_square(const vector<int>& queens, int row, int col, int N)
{
for(int i=0; i<queens.size(); ++i)
{
// case when the queens are already placed in the same row or column
if(queens[i] == row || queens[i] == col) return false;
// case when there is a diagonal threat
// remember! y = mx + c for a diagonal m = 1 therefore |x2 - x1| = |y2 - y1|
if(abs(i - row) == abs(queens[i] - col)) return false;
}
//Returns true when no unsafe square is found
//handles the case when there are no queens on the board trivially
return true;
}
bool is_solution(const vector<int>& queens, int N)
{
return queens.size() == N;
}
void print_solution(const vector<int>& queens, int N)
{
for(int i=0; i<N; ++i)
{
for(int j=0; j<N; ++j)
{
if(queens[i] == j){ cout<<'Q'; }
else { cout<<'_'; }
}
cout<<endl;
}
}
```