Not a solution but maybe you can think this idea a bit further. The problem is that you'll need to calculate also the longest possible path to get all paths. The longest path problem is NP complete for general graphs, so it will get a very long time even for relative small graphs (8x8 and greater).

Imagine the start-vertex is in the top, left corner and the end vertex is in the lower, right corner of the matrix.

- For a 1x2 matrix there is only 1 possible path
- 2x2 matrix => 2*
**1** paths => 2
- 3x2 matrix => 2*
**2** paths => 4
- 3x3 matrix => 2*
**4** + 2*2 paths => 12
- 3x4 matrix => 2*
**12** + 12 + 2 paths => 38

Everytime I combined the results from the previous calculation for the current number of paths. It could be that there is a close formular for such a planar graph, maybe there is even a lot of theory for that, but I am too stupid for that ...

You can use the following Java (sorry, I am not a c++ expert :-/) snippet to calculate possible paths for larger matrices:

```
public static void main(String[] args) {
new Main(3, 2).start();
}
int xSize;
int ySize;
boolean visited[][];
public Main(int maxX, int maxY) {
xSize = maxX;
ySize = maxY;
visited = new boolean[xSize][ySize];
}
public void start() {
// path starts in the top left corner
int paths = nextCell(0, 0);
System.out.println(paths);
}
public int nextCell(int x, int y) {
// path should end in the lower right corner
if (x == xSize - 1 && y == ySize - 1)
return 1;
if (x < 0 || y < 0 || x >= xSize || y >= ySize || visited[x][y]) {
return 0;
}
visited[x][y] = true;
int c = 0;
c += nextCell(x + 1, y);
c += nextCell(x - 1, y);
c += nextCell(x, y + 1);
c += nextCell(x, y - 1);
visited[x][y] = false;
return c;
}
```

=>

- 4x4 => 184
- 5x5 => 8512
- 6x6 => 1262816
- 7x7 (even this simple case takes a lot of time!) => 575780564

This means you could (only theoretically) compute all possible paths from any position of a MxM matrix to the lower, right corner and then use this matrix to quickly look up the number of paths. Dynamic programming (using previous calculated results) could speed up things a bit.