English draughts


English draughts or checkers, also called American checkers or straight checkers, is a form of the strategy board game draughts. It is played on an 8×8 chequered board with 12 pieces per side. The pieces move and capture diagonally forward, until they reach the opposite end of the board, when they are crowned and can thereafter move and capture both backward and forward.
As in all forms of draughts, English draughts is played by two opponents, alternating turns on opposite sides of the board. The pieces are traditionally black, red, or white. Enemy pieces are captured by jumping over them.
The 8×8 variant of draughts was weakly solved in 2007 by the team of Canadian computer scientist Jonathan Schaeffer. From the standard starting position, both players can guarantee a draw with perfect play.

Pieces

Though pieces are traditionally made of wood, now many are made of plastic, though other materials may be used. Pieces are typically flat and cylindrical. They are invariably split into one darker and one lighter colour. Traditionally and in tournaments, these colours are red and white, but black and red are common in the United States, as well as dark- and light-stained wooden pieces. The darker-coloured side is commonly referred to as "Black"; the lighter-coloured side, "White".
There are two classes of pieces: men and kings. Men are single pieces. Kings consist of two men of the same colour, stacked one on top of the other. The bottom piece is referred to as crowned. Some sets have pieces with a crown molded, engraved or painted on one side, allowing the player to simply turn the piece over or to place the crown-side up on the crowned man, further differentiating kings from men. Pieces are often manufactured with indentations to aid stacking.

Rules

Starting position

Each player starts with 12 men on the dark squares of the three rows closest to that player's side. The row closest to each player is called the kings row or crownhead. The player with the darker-coloured pieces moves first. Then alternate.

Move rules

There are two different ways to move in English draughts:
  1. Simple move: A simple move consists of moving a piece one square diagonally to an adjacent unoccupied dark square. Uncrowned pieces can move diagonally forward only; kings can move in any diagonal direction.
  2. Jump: A jump consists of moving a piece that is diagonally adjacent an opponent's piece, to an empty square immediately beyond it in the same direction. Men can jump diagonally forward only; kings can jump in any diagonal direction. A jumped piece is considered "captured" and removed from the game. Any piece, king or man, can jump a king.
Multiple jumps are possible, if after one jump, another piece is immediately eligible to be jumpedeven if that jump is in a different diagonal direction. If more than one multi-jump is available, the player can choose which piece to jump with, and which sequence of jumps to make. The sequence chosen is not required to be the one that maximizes the number of jumps in the turn; however, a player must make all available jumps in the sequence chosen.

Kings

If a man moves into the kings row on the opponent's side of the board, it is crowned as a king and gains the ability to move both forward and backward. If a man moves into the kings row or if it jumps into the kings row, the current move terminates; the piece is crowned as a king but cannot jump back out as in a multi-jump, until another move.

End of game

A player wins by capturing all of the opponent's pieces. The game ends in a draw if by leaving the opponent with no legal move or neither side can force a win, or by agreement.

Rule variations

  1. Capturing with a king precedes capturing with a man. In this case, any available capture can be made at the player's choice.
  2. A man that has jumped to become a king can then in the same turn continue to capture other pieces in a multi-jump.

    Notation

There is a standardised notation for recording games. All 32 reachable board squares are numbered in sequence. The numbering starts in Black's double-corner. Black's squares on the first rank are numbered 1 to 4; the next rank 5 to 8, and so on. Moves are recorded as "from-to", so a move from 9 to 14 would be recorded 9-14. Captures are notated with an "x" connecting the start and end squares. The game result is often abbreviated as BW/RW or WW.

Sample game

White resigned after Black's 46th move.

Unicode

In Unicode, the draughts are encoded in block Miscellaneous Symbols:
The men's World Championship in English draughts dates to the 1840s, predating the men's Draughts World Championship, the championship for men in International draughts, by several decades. Noted world champions include Andrew Anderson, James Wyllie, Robert Martins, Robert D. Yates, James Ferrie, Alfred Jordan, Newell W. Banks, Robert Stewart, Asa Long, Walter Hellman, Marion Tinsley, Derek Oldbury, Ron King, Michele Borghetti, Alex Moiseyev, Patricia Breen, and Amangul Durdyyeva. Championship held in GAYP and 3-Move versions. The winners in men's have been from the United Kingdom, United States, Barbados, and most recently Italy in the 3-Move division.
The woman's championship is more recent and started in 1993, the winners have been from Ireland, Turkmenistan, and Ukraine.
The European Cup has been held since 2013; the World Cup, since 2015.

Computer players

The first English draughts computer program was written by Christopher Strachey, M.A. at the National Physical Laboratory, London. Strachey finished the programme, written in his spare time, in February 1951. It ran for the first time on NPL's Pilot ACE on 30 July 1951. He soon modified the programme to run on the Manchester Mark 1.
The second computer program was written in 1956 by Arthur Samuel, a researcher from IBM. Other than it being one of the most complicated game playing programs written at the time, it is also well known for being one of the first adaptive programs. It learned by playing games against modified versions of itself, with the victorious versions surviving. Samuel's program was far from mastering the game, although one win against a blind checkers master gave the general public the impression that it was very good.
In the 1990s, the strongest program was Chinook, written in 1989 by a team from the University of Alberta led by Jonathan Schaeffer. Marion Tinsley, world champion from 1955–1962 and from 1975–1991, won a match against the machine in 1992. In 1994, Tinsley had to resign in the middle of an even match for health reasons; he died shortly thereafter. In 1995, Chinook defended its man-machine title against Don Lafferty in a thirty-two game match. The final score was 1–0 with 31 draws for Chinook over Don Lafferty. In 1996 Chinook won in the U.S. National Tournament by the widest margin ever, and was retired from play after that event. The man-machine title has not been contested since.
In July 2007, in an article published in Science Magazine, Chinook's developers announced that the program had been improved to the point where it could not lose a game. If no mistakes were made by either player, the game would always end in a draw. After eighteen years, they have computationally proven a weak solution to the game of checkers. Using between two hundred desktop computers at the peak of the project and around fifty later on, the team made just 1014 calculations to search from the initial position to a database of positions with at most ten pieces. However, the solution is only for the initial position rather than for all 156 accepted random 3 move openings of tournament play.

Computational complexity

The number of possible positions in English draughts is 500,995,484,682,338,672,639 and it has a game-tree complexity of approximately 1040. By comparison, chess is estimated to have between 1043 and 1050 legal positions.
When draughts is generalized so that it can be played on an n×n board, the problem of determining if the first player has a win in a given position is EXPTIME-complete.
The July 2007 announcement by Chinook's team stating that the game had been solved must be understood in the sense that, with perfect play on both sides, the game will always finish with a draw. However, not all positions that could result from imperfect play have been analysed.

List of top draughts programs