# Checkered square table in Haskell

Sometimes you need a checkered data structure, for example if you model a chess board. The simplest way to represent checkered data is via list of lists.

``````[[0,1,0],
[1,0,1],
[0,1,0]]
``````

The above is the example of a checkered list. My first attempt:

``````import Data.List

checker :: Integral i => i -> a -> a -> [[a]]
checker n a b = genericTake n \$ intersperse (genericTake n xs2) \$ repeat (genericTake n xs1)
where xs1 = checker' a b
xs2 = drop 1 xs1

checker' :: a -> a -> [a]
checker' a b = intersperse b \$ repeat a
``````

The code is verbose, while the result is correct:

``````*Main> checker 5 0 1
[[0,1,0,1,0],[1,0,1,0,1],[0,1,0,1,0],[1,0,1,0,1],[0,1,0,1,0]]
``````

How do i write a function to create such a list with arbitrary size in Haskell?

-
`checker = tails \$ cycle [0,1]` then trivially `take n . map (take n)` – Sassa NF Mar 24 '14 at 10:02
Why not put it as an answer? – Mirzhan Irkegulov Mar 24 '14 at 13:04

``````evenRow = 0:oddRow                -- evenRow = 0:1:evenRow
oddRow  = 1:evenRow
board   = evenRow:oddRow:board
``````

Here's an infinite checkered board. Saw off any rectangular part:

``````smallBoard = take 17 \$ map (take 11) board
``````

Parameterize this as needed.

EDIT: I haven't used `cycle` here for the sake of illustration. In real code you probably want it:

``````board = cycle [cycle [0,1], cycle [1,0]]
``````

It's much shorter but frankly looks fairly cryptic.

-
This is really clever. I think the cycle version is actually easier to understand. – Tobias Brandt Mar 24 '14 at 12:07
Why not `evenRow = 0:oddRow`? – leftaroundabout Mar 24 '14 at 15:09
@leftaroundabout Good catch. – n.m. Mar 24 '14 at 15:47