# Alpha Beta Pruning, Does it need a extra tree data structure?

The Alpha Beta Pruning Algorithm is as follows:

``````function ALPHA-BETA-SEARCH(state) returns an action
v <- MAX-VALUE(state, -∞, + ∞)
return the action in ACTIONS(state) with value v

function MAX-VALUE(state, α, β) returns a utility value
if TERMINAL-TEST(state) then return UTILITY(state)
v <- -∞
for each a in ACTIONS(state) do
v <- MAX(v, MIN-VALUE(RESULT(state, a), α, β))
if v ≥ β then return v
α <- MAX(α, v)
return v

function MIN-VALUE(state, α, β) returns a utility value
if TERMINAL-TEST(state) then return UTILITY(state)
v <- +∞
for each a in ACTIONS(state) do
v <- MIN(v, MAX-VALUE(RESULT(state, a), α, β))
if v ≤ α then return v
β <- MIN(β, v)
return v
``````

The algorithm states that the Actions function will give a list of all the actions available for a move. Let's take checkers for example, if one checker, A, that is in diagonal with another checker, B.

If A can take B, then that is an action (unavoidable, since we must take the other checker if we can). Or if there are multiple takes, these are actions.

Now the problem is without a tree data structure, the problem can actually be drawn by pencil and paper that looks like a tree.

I think you don't need a tree data structure as extra book keeping? However, at this line: " return the action in ACTIONS(state) with value V".

Now the actions(state) will return the actions that relates to the next step for checker A. The MAX and MIN functions deal with the best moves after A.

If We work out all the algorithm, we will get a value V, and we will follow the node with the value V(next step) that is passed from the terminal node.

PROBLEM: If I call "return the action ACTIONS(state) with the value V", I will only get the actions that lead me to the next state, and I know that one of action leads me to the best possible path. BUT If I don't have extra book keeping, like a tree, I will not be able to match the actions with the value V?

I can implement a extra tree data structure that I could track all the V values for the actions, but I don't think I really need it.

-

You shouldn't build an explicit tree structure in a minimax algorithm, and in practical situations, you can't. A minimax algorithm with a depth bound d and a branching factor b traverse a tree that is O(dᵇ) nodes large, which very soon gets too large to store. (In the version you posted, there isn't even a depth bound, meaning that you would generate the entire game tree.)

The way to keep track of the state is to rewrite the top-level `ALPHA-BETA-SEARCH` as

``````function ALPHA-BETA-SEARCH(state) returns an action
best_a <- nil
max_v <- -∞
for each a in actions(state)
v <- MIN-VALUE(RESULT(state, a), +∞, -∞)
if v > max_v then
max_v <- v
best_a <- a
return best_a
``````

(I.e., "unroll" the top call to `MAX-VALUE` in the main function.)

-
Thanks for the reply. The problem is that, where does best_a <- a comes from? –  user1157751 Apr 17 '12 at 18:40
@user1157751: you're looping over the actions `a`, computing their `v`. When a certain `v` is the maximum you've found so far, you know that the `a` you computed it from is currently the `best_a`. –  larsmans Apr 17 '12 at 19:26
Thanks for your reply, hopefully I get it, because I'm making a game of checkers. –  user1157751 Apr 18 '12 at 7:17
There's a problem when bringing the state into the function. If I bring my original state, it will get changed, and I don't want that, so I give it a original_state.clone(), to let the function use. However, original_state.clone() still changes my GUI? –  user1157751 Apr 18 '12 at 9:05
@user1157751: I'm sorry, the crystal ball is hazy. Post a new question if you have GUI issues. –  larsmans Apr 18 '12 at 9:42
1. The tree is build anyway - implicitly, each `ACTIONS(vertex)` op can simply connect `vertex` to each of his sons - so there is no real need to additional tree building anyway. And of course you can add properties such as `v` to each node of that tree.
2. Neverthess, you don't need and don't care for the actual tree, one possible solution is returning `(v,state)` [a tuple] instead of just `v`. All ops on the return value - will be done on `v`, the same as they are now, the only one who will actually use `state` - is the top level `ALPHA-BETA-SEARCH()`.
Of course it will require less elegant MIN,MAX functions, since you will need to find not only the value `v` - but also the vertex that is giving this value.