Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I'm writing a Connect Four game engine. Currently I'm using Zobrist hashing to generate hash keys for different Connect Four board positions (In order not to do the same thing twice, evaluated board positions are stored in a hash table). The board positions evaluated (nodes in a minimax tree), are always close to each other. Unfortunately close board positions are mapped to uniformly distributed hash-keys leading to a lot of cpu cache misses.

Is it possible to build a hash function which maps close board positions to close hash keys?

A board position for one player is represented by a bitboard of following structure:

.  .  .  .  .  .  .  TOP
5 12 19 26 33 40 47
4 11 18 25 32 39 46
3 10 17 24 31 38 45
2  9 16 23 30 37 44
1  8 15 22 29 36 43
0  7 14 21 28 35 42

I don't know if it is even possible. Thanks for your help!

share|improve this question

2 Answers 2

up vote 1 down vote accepted

I don't think this is possible. A good hash key (like zobrist hashing is for board games) will most likely have pseudo random properties to achieve a uniform distribution of keys in the transposition table. Having the keys of "close" positions close to each other in table contradicts this.

Consider this: Even if you map your board positions one to one to a table with (2^7-1)^7 positions, you will not be able to map "close" board positions to close memory locations: If a piece at a low index changes, positions will be near, but the higher the piece index gets the position differences double each time, and the high ones will be many terabyte apart ;-)

As an author of a chess engine I know this problem. AFAIK nobody solved this problem yet, and everybody uses zobrist hashing, maybe with some minor modifications.

Anyway, good luck solving Connect-4... I know it has been done before, but it is more satisfactory to do it self ;-)

share|improve this answer

Here is how to modify your presumably nearly uniformly random hash function to bias it in a way that similiar board positions are somewhat likely to occur at nearby hashes.

Let hash(gamestate) be your existing function. We'll create a newhash(gamestate) that uses hash for the random behavior, but has a reasonably high probability of generating hashes that are near each other for closely related game states.

Let the 'color' of a board state be the next player to move. If want to find the hash key for the white player, use newhash(board) = hash(board). If you want to find the hash for a black position, find the black piece with maximal number according to your order, say, at position i. Remove piece i from the game state and call the modified state probableparent Then use newhash(board) = hash(probableparent) + i. If you order the positions by likely order of placement (higher things come later as a first order criteria, maybe the middle locations come earlier as a second criteria? I don't really know good strategy for connect4), then it's somewhat likely that on the white turn before the black turn was at probableparent, and hence nicely in your cache and hence i is near by. Also, the 8 possible black moves will likely share the same prev_board state and hence have near by hash locations.

You can extend this idea to roll back more than one ply at a time. Say if current turn % 3 == 2, removing the maximal two moves at board positions i and j , and then use newhash(board) = hash(board-two-removals-ago) + i*48 + j.

share|improve this answer
    
It's 1 am here, so I don't get it right now ;-) In your text, hash() is a random hash function? newhash() is a incremental hash function based on the previous hash and the difference? How do you make sure that hash() == newhash() all the time? –  hirschhornsalz May 5 '11 at 23:05
    
I tried to clarify. You don't want hash() == newhash() all the time (because hash() has poor locality). The key idea is to use the leverage the structure of the game state so that newhash(g) = hash(g') + small offset for related game states g and g'. –  Rob Neuhaus May 6 '11 at 1:45
    
But isn't it required that the hash() == newhash() all the time? Imagine you have a position hash generated via newhash() and want to check if this position hash already been reached with a different move order (that's actually the main point of a transposition table). The position stored may now have a different hash, so you will not find it. –  hirschhornsalz May 6 '11 at 1:55
1  
Suppose you have a position p1 and a move m1 and a p2,m2 which lead to the same position p. Now if you want to find p in your hash, it is required that hash(p1)+i(m1) == hash(p2)+i(m2) (again, that's the purpose of a transposition table). If hash() is pseudorandom (as required for an equal distribution of keys) and i() is some 'near' function, how could that be achieved? Please give some examples for hash() and i(), I am very interested –  hirschhornsalz May 6 '11 at 2:02
    
It's required that newhash(g) = newhash(g*) if g = g*, regardless of the order of turns that generated g and g*. newhash() has this property. Read carefully, I don't mention anything about order that players made their moves, only the state of the game. The maximal numbered piece is only a property of the board, not the turn order. –  Rob Neuhaus May 6 '11 at 2:26

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.