In learning Haskell I have set a puzzle for myself which is to write a 4 X 4 KenKen solver. This involves placing the number 1 to 4 in a 4 by 4 matrix such that each row and column contains distinct values. There are also cages which constrain the numbers contained within based on addition, multiplication, division (two cells only) or subtraction (two cells only). For full rules see wikipedia page on KenKen.
I've been programming imperatively for 30 years and I'm wondering how to approach this in Haskell. It's here that I need some advice as an absolute beginner.
My sketchy overview :-
- for the moment, just hardcode the constraints and any starting numbers to avoid having to learn how to do IO and parsing,
- keep it at 4 by 4 for the moment to make life simplier,
- treat the cells as an immutable list of
Maybe intwith length 16,
- create a typeclass for
constraintwhich can take a list of cells and return a boolean for if the constranit if violated or not (or is this a bit OO and I should create functions for these?),
- a constraint would say something like cells in positions 1, 2 and 5 must add up to 6. A function would take a list of cells it would return true or false,
- write constraints for plus, minus, divide, multiply and unique,
- create a recursive
solvefunction that takes in the cells and a list of constraints,
solvewill check the cells against each of the constraints and call itself with new list trying out a different number or backtrack
So my question is, does this approach seems like it would work and is it idomatic in Haskell? Can you suggest how I could do something more functional without needing to know anything too advanced. I'm not interested in this being the most performant way to solve this problem since it's just an learning exercise I set myself.
EDIT: The answer and comments below centre around the need for the type class so that's probably the bit I'm getting wrong. I feel the need for it so I can treat all the different sorts of constraints polymorphically. I believe what everyone is saying is that this is insufficient and I can just have a list of functions that accept a list of cells and return the boolean.