Black Path Game


The Black Path Game is a two-player board game described and analysed in Winning Ways for your Mathematical Plays. It was invented by Larry Black in 1960.
It has also been reported that a game known as "Black" or "Black's Game" was invented in 1960 by William L. Black. This "William L. Black" was at that time an undergraduate at the Massachusetts Institute of Technology, investigating Hex and Bridg-it, two games based on the challenge to create a connected “chain” of counters that link opposite sides of a game board. The creative outcome of Black’s research was a new topological game that his friends called Black. The game was introduced to the public by Martin Gardner in his October 1963 "Mathematical Games column" in Scientific American.

Rules

The Black Path Game is played on a board ruled into squares. Any square that is not empty is filled with one of the following configurations:
These tiles are the three ways to join the sides of the square in pairs. The first two are
the tiles of the Truchet tiling.
One edge on the boundary of the board is designated to be the start of the path. The players alternate filling the square just after the end of the current path with one of the three configurations above, extending the path. The path may return to a previously filled square and follow the yet-unused segment on that square. The player who first causes the path to
run back into the edge of the board loses the game.

Strategy

The first player has a winning strategy on any rectangular board with at least one side-length even. Imagine the board covered with dominoes. The first player should always play so that the end of the path falls on the middle of one of the dominoes.
If both sides of the board are odd, the second player can instead win by using a domino tiling including every square but the one containing the first player's first move.