OK, my issue should sound pretty familiar to anyone who has played with board game programming, so here it is :

- I've implemented a variation of the MiniMax algorithm (returning moves instead of min/max values).
- I've also tried setting it up as an alpha-beta, although it ended up a complete failure.

So, here's my MiniMax code :

```
Move* Board::miniMax(int depth)
{
return this->maxMove(1, depth);
}
Move* Board::maxMove(int ply, int depth)
{
vector<Move*> moves = this->possibleMoves();
int movesSize = moves.size();
Move* maxMove = new Move(MINUS_INF);
for (int i=0; i<movesSize; i++)
{
Move* move = moves[i];
HASHMAKE(move,this);
move->value = (ply<depth) ? (this->minMove(ply+1, depth))->value
: this->eval();
maxMove = MAXMOVE(maxMove,move);
UNHASHMAKE(move,this);
}
return maxMove;
}
Move* Board::minMove(int ply, int depth)
{
vector<Move*> moves = this->possibleMoves();
int movesSize = moves.size();
Move* minMove = new Move(PLUS_INF);
for (int i=0; i<movesSize; i++)
{
Move* move = moves[i];
HASHMAKE(move,this);
move->value = (ply<depth) ? (this->maxMove(ply+1, depth))->value
: this->eval();
minMove = MINMOVE(minMove,move);
UNHASHMAKE(move,this);
}
return minMove;
}
```

Any ideas one how the above thing could be adjusted so that it's an Alpha-Beta search?

And here's my attempt at Alpha-Beta conversion (which fails miserably) :

```
Move* Board::alphaBeta(int depth)
{
return this->alphaMax(1,depth,MINUS_INF,PLUS_INF);
}
Move* Board::alphaMax(int ply, int depth, int a, int b)
{
vector<Move*> moves = this->possibleMoves();
int movesSize = moves.size();
Move* maxMove = new Move(MINUS_INF);
for (int i=0; i<movesSize; i++)
{
Move* move = moves[i];
HASHMAKE(move,this);
move->value = (ply<depth) ? (this->alphaMin(ply+1, depth,a,b))->value
: this->eval();
maxMove = MAXMOVE(maxMove,move);
if (maxMove->value>=b) return maxMove;
a = MAXVAL(a,maxMove->value);
UNHASHMAKE(move,this);
}
return maxMove;
}
Move* Board::alphaMin(int ply, int depth, int a, int b)
{
vector<Move*> moves = this->possibleMoves();
int movesSize = moves.size();
Move* minMove = new Move(PLUS_INF);
for (int i=0; i<movesSize; i++)
{
Move* move = moves[i];
HASHMAKE(move,this);
move->value = (ply<depth) ? (this->alphaMax(ply+1, depth,a,b))->value
: this->eval();
minMove = MINMOVE(minMove,move);
if (minMove->value<=a) return minMove;
b = MINVAL(b,minMove->value);
UNHASHMAKE(move,this);
}
return minMove;
}
```

**HINTS (to avoid any misunderstanding) :**

the

`this->eval()`

function returns a score from player A's perspective. E.g. a +100 score means the position is in favour of player A, while a -100 score means the position is in favour of player B.`MINUS_INF`

and`PLUS_INF`

have been defined as some arbitrarily small and big values, respectively.This not anything like a homework or anything (if it was I'd most likely never have any interest to play with such stuff... lol)

`Move`

is a simple class containing details about the move, as well as it's respective value (as assigned by the`eval`

function.`HASHMAKE`

and`UNHASHMAKE`

are just 2 move-(un)making and move-(un)hashing macros, that shouldn't make much difference.`MAXMOVE`

is defined like this :`#define MAXMOVE(A,B) (((A)->value>=(B)->value)?(A):(B))`

`MINMOVE`

is defined like this :`#define MINMOVE(A,B) (((A)->value<=(B)->value)?(A):(B))`