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Chapter 7 Two Player Perfect-Information Games. Computer Chess A natural domain for studying AI. The game is well structured. Perfect information game. Early programmers and AI researchers were often amateur chess players as well. Brief History of Computer Chess. Maelzel’s Chess Machine

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## Chapter 7 Two Player Perfect-Information Games

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**Chapter 7**Two Player Perfect-Information Games**Computer Chess A natural domain for studying AI**• The game is well structured. • Perfect information game. • Early programmers and AI researchers were often amateur chess players as well.**Brief History of Computer Chess**• Maelzel’s Chess Machine • 1769 Chess automaton by Baron Wolfgang von Kempelen of Austria • Appeared to automatically move the pieces on a board on top of the machine and played excellent chess. • Puzzle of the machine playing solved in 1836 by Edgar Allen Poe.**Brief History of Computer Chess**Maelzel’s Chess Machine**Brief History of Computer Chess**• Early 1950’s - First serious paper on computer chess was written by Claude Shannon. Described minimax search with a heuristic static evaluation function and anticipated the need for more selective search algorithms. • 1956 - Invention of alpha-beta pruning by John McCarthy. Used in early programs such as Samuel’s checkers player and Newell, Shaw and Simon’s chess program.**Brief History of Computer Chess**• 1982- Development of Belle by Condon and Thomson. Belle - first machine whose hardware was specifically designed to play chess, in order to achieve speed and search depth. • 1997 - Deep Blue machine was the first machine to defeat the human world champion, Garry Kasparov, in a six-game match.**Checkers**• 1952 - Samuel developed a checkers program that learned its own evaluation through self play. • 1992 - Chinook (J. Schaeffer) wins the U.S Open. At the world championship, Marion Tinsley beat Chinook.**Othello**• Othello programs better than the best humans. • Large number of pieces change hands in each move. • Best Othello program today is Logistello (Michael Buro).**Backgammon**• Unlike the above games backgammon includes a roll of the dice, introducing a random element. • Best backgammon program TD -gammon(Gerry Tesauro). Comparable to best human players today. • Learns an evaluation function using temporal-difference.**Card games**• In addition to a random element there is hidden information introduced. • Best bridge GIB (M.Ginsberg) • Bridge games are not competitive with the best human players. • Poker programs are worse relative to their human counterparts. • Poker involves a strong psychological element when played by people.**Other games - Summary**• The greater the branching factor the worse the performance. • Go - branching factor 361 very poor performance. Checkers - branching factor 4 - very good performance. • Backgammon - exception. Large branching factor still gets good results.**Brute-Force Search**• We begin considering a purely brute-force approach to game playing. • Clearly, this will only be feasible for small games, but provides a basis for further discussions. • Example - 5-stone Nim • played with 2 players and pile of stones. • Each player removes one or two stones from the pile. • player who removes the last stone wins the game.**5**4 3 2 2 1 3 2 1 1 0 1 0 0 1 0 0 0 0 OR nodes AND nodes x x 0 Example - Game Tree for 5-Stone Nim + + + +**Minimax**• Minimax theorem - Every two-person zero-sum game is a forced win for one player, or a forced draw for either player, in principle these optimal minimax strategies can be computed. • Performing this algorithm on tic-tac-toe results in the root being labeled a draw.**A strategy**• A strategy is a method which tells the player how to play in each possible scenario. • Can be described implicit or explicit • An explicit strategy is a subtree of the search tree which branches only at the opponent moves. • The size of the subtree b^d/2**5**4 3 2 2 1 3 2 1 1 0 1 0 0 1 0 0 0 0 OR nodes AND nodes x x 0 Example - strategy for 5-Stone Nim + + + +**MinMax propgation**• Start from the leaves. • At each step, evaluate the value of all descendants: • take the maximum if it is A’s turn, or the minimum if it isB’s turn • The result will be the value of the tree.**Heuristic Evaluation Functions**• Problem: How to evaluate positions, where brute force is out of the question? • Solution: Use a heuristic static evaluationfunction to estimate the merit of a position when the final outcome has not yet been determined.**Example of heuristic Function**• Chess : • Number of pieces on board of each type multiplied by relative value summed up for each color. By subtracting the weighted material of the black player from the weighted material of the white player we receive the relative strength of the position for each player.**Heuristic Evaluation Functions**• A heuristic static evaluation function for a two player game is a function from a state to a number. • The goal of a two player game is to reach a winning state, but the number of moves required to get there is unimportant. • Other features must be taken into account to get to an overall evaluation function.**Heuristic Evaluation Functions**• Given a heuristic static evaluation function, it is straightforward to write a program to play a game. • From any given position, we simply generate all the legal moves, apply our static evaluator to the position resulting from each move, and then move to the position with the largest or smallest evaluation, depending if we are MIN/MAX**Example - tic-tac-toeBehavior of Evaluation Function**• Detect if game over. • If Xis the Maximizer, the function should return if there are three X’s in a row and - if there are three O’s in a row. • Count of the number of different rows, columns, and diagonals occupied by O.**Example: First moves of tic-tac-toe**X X X 3-0 = 3 4-0=4 2-0 = 2**Example - tic-tac-toeBehavior of Evaluation Function**• This algorithm is extremely efficient, requiring time that is only linear in the number of legal moves. • It’s drawback is that it only considers immediate consequences of each move (doesn’t look over the horizon).**1**0 1 0 -1 -1 0 -1 0 -2 Minimax Search Where does X go? X X X 4-3 = 1 4-2 = 2**Minimax search**• Search as deeply as possible given the computational resources of the machine and the time constraints on the game. • Evaluate the nodes at the search frontier by the heuristic function. • Where MIN is to move, save the minimum of it’s children’s values. Where MAX is to move, save the maximum of it’s children’s values. • A move is made to a child of the root with the largest or smallest value, depending on whether MAX or MIN is moving.**MAX**4 MIN 4 2 4 8 2 14 4 2 6 8 1 2 12 14 4 5 3 2 6 7 8 9 1 10 2 11 12 13 14 14 Minimax searchexample Minimax Tree**Nash equilibrium**Nash equilibrium: • Once an agreement has been reached, it is not worthwhile for any of the players to deviate from that agreement given that the other players do not deviate. • Example: The market place: • agreement: no one sells a hot dog for less than 10$ • Is it worthwhile for me to reduce the price?? • No, they will burn my stand.**Example: prisoners dilemma**Should the prisoner “rat” on his friend? No equilibrium equilibrium quite rat quite rat 0 dead quite quite 1 1 3 3 1 1 3 3 3 3 rat rat 0 dead 3 3**MAX**4 MIN 4 2 4 8 2 14 4 2 6 8 1 2 12 14 4 5 3 2 6 7 8 9 1 10 2 11 12 13 14 14 Nash equilibrium • The principal branch values are in Nash equilibrium**Alpha-Beta Pruning**• By using alpha-beta pruning the minimax value of the root of a game tree can be determined without having to examine all the nodes.**MAX**MIN Alpha-Beta Pruning Example a 4 b 4 m 2 c i n 4 >=6 <=2 d g <=3 j 4 6 o <=1 q <=2 4 5 3 6 7 1 2 e f h k l p r**Alpha-Beta**• Deep pruning - Right half of tree in example. • Next slide code for alpha-beta pruning : • MAXIMIN - assumes that its argument node is a maximizing node. • MINIMAX - the same. • V(N) - Heuristic static evaluation of node N.**MAXIMIN ( node: N ,lowerbound : alpha ,upperbound: beta)**IF N is at the search depth, RETURN V(N) FOR each child Ni of N value = MINIMAX(Ni,alpha,beta) IF value > alpha , alpha := value IF alpha >= beta ,return alpha RETURN alpha MINIMAX ( node: N ,lowerbound : alpha ,upperbound: beta) IF N is at the search depth, RETURN V(N) FOR each child Ni of N value = MAXIMIN(Ni,alpha,beta) IF value < beta , beta := value IF beta <= alpha, return alpha RETURN beta**Performance of Alpha-Beta**• Efficiency depends on the order in which the nodes are encountered at the search frontier. • Optimal - b½ - if the largest child of a MAX node is generated first, and the smallest child of a MIN node is generated first. • Worst - b. • Average b¾ - random ordering.**Games with chance**• chance nodes: nodes where chance events happen (rolling dice, flipping a coin, etc) • Evaluate expected value by averaging outcome probabilities: • C is a chance node • P(di) probability of rolling di (1,2, …, 12) • S(C,di) is the set of positions generated by applyingall legal moves for roll dito C**Games with chance**Backgammon board**MAX**0.5 0.5 0.5 0.5 MIN Search tree with probabilities 3 -1 2 4 0 -2 2 4 7 4 6 0 5 -2**Additional Enhancements**• A number of additional improvements have been developed to improve performance with limited computation. • We briefly discuss the most important of these below.**Node Ordering**• By using node ordering we can get close to b½. • Node ordering instead of generating the tree left-to-right, we reorder the tree based on the static evaluations of the interior nodes. • To save space only the immediate children are reordered after the parent is fully expanded.**Iterative Deepening**• Another idea is to use iterative deepening. In two player games using time, when time runs out, the move recommended by the last completed iteration is made. • Can be combined with node ordering to improve pruning efficiency. Instead of using the heuristic value we can use the value from previous iteration.**Quiescence**• Quiescence search is to make a secondary search in the case of a position whose values are unstable. • This way obtains a stable evaluation.**Transposition Tables**• For efficiency, it is important to detect when a state has already been searched. • In order to detect a searched state, previously generated game states, with their minimax values are saved into a transposition table.**Opening Book**• Most board games start with the same initial state. • A table of good initial moves is used, based on human expertise, known as an opening book.**Endgame Databases**• A database of endgame moves, with minimax values, is used. • In checkers, endgame for less than eight or fewer pieces on board. • A technique for calculating endgame databases, retrograde analysis.

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