# C++ minimax function

I have searched Google and Stackoverflow for this question, but I still don't understand how a minimax function works.

I found the wikipedia entry has a pseudocode version of the function:

``````function integer minimax(node, depth)
if node is a terminal node or depth <= 0:
return the heuristic value of node
α = -∞
for child in node:                       # evaluation is identical for both players
α = max(α, -minimax(child, depth-1))
return α
``````

Several other minimax functions I found with Google are basically the same thing; I'm trying to implement this in C++, and this is what I have come up with so far:

``````double miniMax(Board eval, int iterations)
{
//I evaluate the board from both players' point of view and subtract the difference
if(iterations == 0)
return boardEval(eval, playerNumber) - boardEval(eval, opponentSide());

/*Here, playerTurn tells the findPossibleMoves function whose turn it is;
I mean, how do you generate a list of possible moves if you don't even know
whose turn it's supposed to be? But the problem is, I don't see where I can
get playerTurn from, as there are only 2 parameters in all the examples of
minimax I've seen*/
vector<int> moves = eval.findPossibleMoves(playerTurn);

//I'm assuming -∞ in the wikipedia article means a very low number?
int result = -999999999;

//Now I run this loop to evaluate each possible move
/*Also, the Lua example in the wiki article has
alpha = node.player==1 and math.max(alpha,score) or math.min(alpha,score)
Is alpha a boolean there?!*/
for(int i = 0; i * 2 < moves.size(); i++)
{
//I make a copy of the board...
Board temp = eval;

/*and make the next possible move... once again playerTurn crops up, and I
don't know where I can get that variable from*/
temp.putPiece(moves[i * 2], moves[i * 2 + 1], playerTurn);

/*So do I create a function max that returns the bigger of two doubles?*/
result = max(result, -miniMax(temp, iterations - 1));
}

return result;
/*So now I've returned the maximum score from all possible moves within a certain
# of moves; so how do I know which move to make? I have the score; how do I know
which sequence of moves that score belongs to?*/
}
``````

As you can see, I'm pretty confused about this minimax function. Please at the very least give me some hints to help me with this.

Thanks! :)

-
I'd focus on understanding the principles of the algorithm before diving into the code. Here's a decent explanation: ai-depot.com/articles/minimax-explained –  Odrade Sep 2 '10 at 20:05

That sample from Wikipedia is doing NegaMax with Alpha/Beta pruning.

You may be helped by getting the naming straight:

• The basis is MiniMax, a literal implementation would involve 2 methods that take turns (mutually recursive), 1 for each side.

• Lazy programmers turn this into NegaMax, one method with a strategically placed `-` operator.

• Alpha/Beta pruning is keeping track of a Window of best moves (over multiple depths) to detect dead branches.

Your `playerTurn` is used to determine whose turn it is . In NegaMax you can derive this from the depth (iterations) being odd or even. But it would be easier to use 2 parameters (myColor, otherColor) and switch them at each level.

-
a-b pruning? where? –  Nick Dandoulakis Sep 2 '10 at 20:06
thanks for clearing some stuff up! In what ways would the 2 functions in minimax differ? also, if I derive the player's turn from its being odd/even, then it means that I absolutely must end the search on the computer AI's turn (so that I cannot look at what moves the human can make and simply stop there)? –  wrongusername Sep 2 '10 at 20:07
@Nick, you're right, I was seeing things (because of that α variable). –  Henk Holterman Sep 2 '10 at 20:07
@wrongname, you're right that the odd/even method has a starting problem. I would use parameter(s) for clarity. In a straight MiniMax you would hardcode that playerTurn color, there is a black and a white method and they call each other. For the rest they only differ in mirrored `>` and `<` operators. –  Henk Holterman Sep 2 '10 at 20:11

Your miniMax() function should remember the best move it found so far. So instead of this code:

``````
/*So do I create a function max that returns the bigger of two doubles?*/
result = max(result, -miniMax(temp, iterations - 1));
``````

You should do something like this:

``````
/*So do I create a function max that returns the bigger of two doubles?*/
double score = -miniMax(temp, iterations - 1);
if (score > result)
{
result = score;
bestMove = i;
}
``````

Of course, you need a variable "bestMove" and a way to return the best move found to the caller.

-
So I guess it'll have to be a little different from the examples then :) –  wrongusername Sep 2 '10 at 20:01

Add the `playerTurn` variable as an argument to `miniMax`, and call `miniMax` which the current player's move initially and recursively.

Also, `opponentSide` needs to be a function of `playerTurn`.

-
`playerTurn` is just an int telling the function which side the player is on. `opponentSide` is part of the class from which this function is in –  wrongusername Sep 2 '10 at 20:00

A good place to start with game tree searching is the chess programming wiki. For your question about the move: I think it is most common to have two max-functions. The difference between the two max functions is that one returns only the score and the other returns the score and the best move. A recursive call order would be like following:

``````maxWithBestMoveReturn(...) --> min(...) --> max(...) --> min(...)
``````

There are some good papers with pseudocode for the Alpha Beta algorithm:

To your question in the comment: and math.max(alpha,score) or math.min(alpha,score) Is alpha a boolean there?!

No alpha is a window bound in a alpha beta algorithm. The alpha value gets updated with a new value. Because alpha and beta are swapped with the recursive call of the negamax-Function the alpha variable refers to the beta variable in the next recursive call.

One note to the playerTurn variable: The minimax or alpha-beta algorithm doesn't need this information. So i would give the information -- who's next --, into the Board-Structure. The functions findPossibleMoves and boardEval get all information they need from the Board-Structure.

One note to the recursive break condition: If i understand your code right, then you only have the one with `iterations == o`. I think this means the algorithm has reached the desired depth. But what if there are no possible moves left befor the algorithm reaches this depth. Maybe you should write following:

``````vector<int> moves = findPossibleMoves(...);
if (!moves.size())
return boardEval(...);
``````
-
Thanks for all the hints! I've implemented already several of them before I saw your comment :D and will probably implement more –  wrongusername Sep 6 '10 at 0:15

In your pseudocode, the node variable has to contain all the information about the current board position (or whatever). This information would include whose turn it is to move.

-