If you want a simple function, you could use a recursive definition.
H = height
if x == 0
if y == 0
return get_point(x-1,y) + H
This takes advantage of the fact that any value is H+the value of the item to its left. If the item is already at the leftmost column, then you find the cell that is to its far upper right diagonal, and move left from there, and add 1.
This is a good chance to use dynamic programming, and "cache" or memoize the functions you've already accomplished.
If you want something "strictly" done by f(n), you could use the relationship:
n = ( n % W , n / H ) [integer division, with no remainder/decimal]
And work your function from there.
Alternatively, if you want a purely array-populating-by-rows method, with no recursion, you could follow these rules:
- If you are on the first cell of the row, "remember" the item in the cell (R-1) (where R is your current row) of the first row, and add 1 to it.
- Otherwise, simply add H to the cell you last computed (ie, the cell to your left).
Psuedo-Code: (Assuming array is indexed by
arr[0,0] = 0
for R from 0 to H
if R > 0
arr[R,0] = arr[0,R-1] + 1
for C from 1 to W
arr[R,C] = arr[R,C-1]