# How to Iterate from back to front in a diamond-shaped isometric map

Imagine a diamond-shaped isometric map, which is basically a 2D array with (x,y) coordinates and the top cell as the origin, as marked in the cells:

I want to iterate through these cells from back to front, in the following order:

What's the algorithm to loop in this way through an unknown same-sided map?

Expected output: [0,0], [0,1], [1,0], [0,2], [1,1], [2,0], [0,3], etc

-

python pseudocode:

``````def iterate_cells(n):
for i in range(n):
for j in range(i+1):
yield (j, i-j)
for i in range(1, n+1):
for j in range(n - i):
yield(i+j, n-j-1)
``````

output:

``````In [119]: list(iterate_cells(5))
Out[119]:
[(0, 0),
(0, 1),
(1, 0),
(0, 2),
(1, 1),
(2, 0),
(0, 3),
(1, 2),
(2, 1),
(3, 0),
(0, 4),
(1, 3),
(2, 2),
(3, 1),
(4, 0),
(1, 4),
(2, 3),
(3, 2),
(4, 1),
(2, 4),
(3, 3),
(4, 2),
(3, 4),
(4, 3),
(4, 4)]
``````
-
Ah, I just realized it's missing the bottom part of the cells, it only shows them up until (4,0). But thanks! I knew there was a simple way of doing this, my algorithm was full of ifs and whiles, so depressing :) – Alessandro Ituarte Jan 26 '12 at 14:59
true, I've updated it with the lower part too – fortran Jan 26 '12 at 17:35
This is fantastic. Thank you! Here is the equivalent in Coffee-Script/JS should anyone need it for a canvas project etc. – RayViljoen Jan 26 '13 at 13:03

Considering map is contained in a matrix M(n,n):

``````// lateral loop above diagonal
for (int i=0; i<n; i++) {
// diagonal loop
for (int j=0; j<i; j++) {
// the coords you are looking for are: row=(i-j), col=(i+j)
int currentTileValue = M[i-j, i+j];
}
}
// sub-diagonal lateral loop
for (int j=1; j<n; j++) {
// diagonal loop
for (int i=0; i<(n-j); i++) {
// the coords you are looking for are: row=(j-i), col=(j+i)
int currentTileValue = M[j-i, j+i];
}
}
``````

didn't test it in detail, but I think i think it works. Anyhow you get the idea.

-
Thanks for the submission! Unfortunately the conditionals for the first "for" seem to be off. With these values the condition would pass, and the values would be out of bounds: M(5,5) i = 4 j = 2, since i+j > 5 – Alessandro Ituarte Jan 26 '12 at 14:22