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This page is written by the game's inventor, David Fisher.

Hamiltonian Chess


The aim of this chess variant is to be the first to form a Hamiltonian Path or Circuit between all of your pieces. The same piece may not be visited twice in a path or circuit.

In the diagram below, white has formed the circuit e2-d1-b3-b8-g3-e4-f6-a6 and then back to e2, and black has formed the path e3-h6-h7-e7-d5-a5-a3-b1.


Each player starts with eight pieces (pawns being excluded from the game). Players alternate placing one of their opponent's pieces on the board at a time, starting with white placing a black piece.

White moves first.


There is no notion of Check or Mate in this game, and the King has no particular disadvantages or privileges (such as castling).

Movement and capturing is performed in the same way as in FIDE Chess. Note that it may benefit your opponent more than yourself to capture their pieces, since it makes it simpler for them to form a complete path or circuit. (Note that a single remaining piece counts as a circuit).

At any time during the game, a player may announce victory by pointing out a completed Hamiltonian Path or Circuit involving all of their remaining pieces (starting from any piece). If the other player is able to point out a path or circuit involving all of their own pieces, the game is a draw; otherwise the announcing player wins. If a path or circuit is completed without being announced by the player, victory is not automatic (and there is no retrospective victory if it is later destroyed). The only exception to this rule is if a player is reduced to a single piece, in which case the game ends immediately, just as if the player had announced victory.


If multiple games are played, the winner of each game scores as follows:

Thus the number of points per game is from 2 to 16 (since a single remaining piece counts as a circuit), or 0 in the case of a draw.

If a player resigns, their opponent scores twice the number of their remaining pieces (as if they had completed a circuit).


It is probably wise to place your opponent's bishops on different colored squares.

Aim to keep your opponent's pieces apart, and prevent the formation of unbreakable "clusters".

An alternative scoring system which discourages this behavior is to score the total length of the path/circuit rather than the number of remaining pieces, where the distance between two pieces equals the maximum of the vertical and horizontal difference in position (e.g.. a knight move would always score 2 points; the maximum is 7). A circuit consisting of a single piece scores 1 point rather than 0.

The maximum attainable score using this alternative system is left as an exercise to the reader; the upper bound is (maximum score of 7) * (8 circuit segments) * (2 for being a circuit) = 112.