**Task definition:**

I have a matrix of natural numbers. The task is to find path from the top-left corner of matrix to bottom-right corner of matrix and dial maximum score. Rules of navigation: if you are located in [i][j] you can move: a) to [i][j-1], [i][j+1], [i+1][j] cells and dial zero points b) to [i+1][j+1] and dial matrix[i][j] points

**Little example:**

Assume you have `score 50`

and `matrix`

```
0 3 5 3 2
4 7 2 5 2
4 3 5 2 5
```

Assume you are in [1][1] cell (matrix[1][1] = 7). You can navigate to:

```
a) [1][0] cell with 50 score
b) [1][2] cell with 50 score
c) [2][1] cell with 50 score
d) [2][2] cell with 57 score
```

**What a problem:**

I solve this task in very slow way...

I try to implement in with help of recursion. It's easy if you just want to find maximum score. Something like

```
public int loop(int i, int j) {
int left = loop(i, j-1);
int top = loop(i-1, j);
int diagonal = loop(i-1,j-1) + matrix[i-1][j-1];
return maximum(left, top, diagonal);
}
```

**BUT, I want to find a path with maximum score! And it's very time/memory consuming.**

*Why it's time/memory consuming:*

And there is one problem: I need store path-collection and pass it as a parameter to the loop method. But loop method forks on each iteration and I have to copy path-collection thee times an iteration. Otherwise, each of loop forks will modify common path-collection and finally I will have in it all possible paths. I mean if between `left`

, `top`

& `diagonal`

the biggest is `left`

that we must not to include paths linked with `top`

and `diagonal`

.

**Question:**

*How to solve it in right way?*

**EDIT:**

Actually there is no need to find the full path. It only need to find point's in which you dial a score (in which you make a diagonal moves)

`[i]`

. It's not that hard. – RBarryYoung Oct 29 '13 at 22:26`[i][j-1]`

,`[i][j+1]`

transitions from`[i][j]`

? – user568109 Oct 30 '13 at 8:28