I am working on a Haskell implementation of a Spider Solitaire player, both as an exercise in learning Haskell and trying to find a good player algorithm.

I am looking for an efficient representation for the tableau, which consists of the undealt deck, the stacks, and the foundation.

For the deck, the most obvious representation is as a `[Card]`

where `Card`

is an algebraic data type:

```
data Rank = Ace
| Two
| Three
| Four
| Five
| Six
| Seven
| Eight
| Nine
| Ten
| Jack
| Queen
| King
deriving (Bounded, Enum, Eq, Ord)
data Suit = Clubs
| Diamonds
| Hearts
| Spades
deriving (Bounded, Enum, Eq, Ord)
data Card = Card
{ rank :: Rank
, suit :: Suit
, faceUp :: Bool
} deriving (Bounded, Eq, Ord)
-- I omitted the instance Show ... implementations
```

The foundation (the completed suits) can be represented as either a `[(Card King suit True)]`

or simply an `Int`

count of completed suits, since determining a winning game just requires confirming that the foundation size is 8.

The best representation for the stacks (the cards in play) is the part I am struggling with. If I were writing this in Scala or Clojure, I would probably use an immutable (persistent) `Vector`

of `[Card]`

. A vector allows fast indexed look up of the card lists for legal move calculation, using a list comprehension. The card lists are stored with the top card (facing up) as the head of the list. Moving cards from one list to another can be done with a combination of drop and prepend or cons.

In Haskell, I'm not sure if this is best represented as a list of card lists or an array of card lists, or some other data structure that I have not found yet.

Thoughts?