This is a work-in-progress implementation of a n-dimensional Chess framework.
For an n-d game, the Bishop could move to the vertices of an integer i-cube (2 <= i <= n) in n-d space centered in the current position of the Bishop. This is equivalent to say the Bishop can move through its diagonals.
For example, in a 3-d game, the Bishop could move according to (k * _ for _ in BishopOffsets[i]), with k being an integer from 1 to board.size - 1.
BishopOffsets = [
# 2-cube vertices in 3-d space
(1, 1, 0),
(1, -1, 0),
(-1, 1, 0),
(-1, -1, 0),
# 3-cube vertices in 3-d space
(1, 1, 1),
(1, 1, -1),
(1, -1, 1),
(1, -1, -1),
(-1, 1, 1),
(-1, 1, -1),
(-1, -1, 1),
(-1, -1, -1)
]For an n-d game, the King could move to the vertices of an unit i-cube (2 <= i <= n) in n-d space centered in the current position of the King, and it nearest cardinal positions. This is equivalent to say the King can move 1 spot through every direction.
For example, in a 3-d game, the King can move according to KingOffsets[i].
KingOffsets = [
# 2-cube vertices in 3-d space
(1, 1, 0),
(1, -1, 0),
(-1, 1, 0),
(-1, -1, 0),
# 3-cube vertices in 3-d space
(1, 1, 1),
(1, 1, -1),
(1, -1, 1),
(1, -1, -1),
(-1, 1, 1),
(-1, 1, -1),
(-1, -1, 1),
(-1, -1, -1),
# cardinals in 3-d space
(1, 0, 0),
(-1, 0, 0),
(0, 1, 0),
(0, -1, 0),
(0, 0, 1),
(0, 0, -1)
]For an n-d game, the Knight could move 2 spots in a direction and 1 spot in a different direction.
For example, in a 3-d game, the Knight could move according to KnightOffsets[i].
from itertools import product
KnightOffsets = []
for i in range(3): # 3-d space
for j in range(3): # 3-d space
if i == j: continue
for p, q in product((-1, 1), repeat=2):
offset = [0] * 3 # 3-d space
offset[i] = 2 * p
offset[j] = 1 * q
KnightOffsets.append(tuple(offset))For an n-d game, the Pawn could move forward 1 spot in the dimensions greater than 1. To capture, the Pawn can move one spot in the first dimension (any direction) and forward 1 spot in dimensions greater than 1.
For example, in a 3-d game, the Pawn could move according to PawnOffsets[i], or PawnCaptureOffsets[i] if available.
PawnOffsets = [
# "Forward 1 spot in the dimensions grater than 1" (unit vectors for dimensions grater than 1)
# (1, 0, 0),
(0, 1, 0),
(0, 0, 1)
]
PawnCaptureOffsets = [
# "One spot in the first dimension (any direction) and forward 1 spot in the dimensions greater than 1"
(1, 1, 0),
(-1, 1, 0),
(1, 0, 1),
(-1, 0, 1)
]For an n-d game, the Queen could move to the vertices of an integer i-cube (2 <= i <= n) in n-d space centered in the current position of the Queen, and to an integer scaled cardinal position. This is equivalent to say the Queen can move through every direction.
For example, in a 3-d game, the Queen could move according to (k * _ for _ in QueenOffsets[i]), with k being an integer from 1 to board.size - 1.
QueenOffsets = [
# 2-cube vertices in 3-d space
(1, 1, 0),
(1, -1, 0),
(-1, 1, 0),
(-1, -1, 0),
# 3-cube vertices in 3-d space
(1, 1, 1),
(1, 1, -1),
(1, -1, 1),
(1, -1, -1),
(-1, 1, 1),
(-1, 1, -1),
(-1, -1, 1),
(-1, -1, -1),
# cardinals in 3-d space
(1, 0, 0),
(-1, 0, 0),
(0, 1, 0),
(0, -1, 0),
(0, 0, 1),
(0, 0, -1)
]For an n-d game, the Rook could move through an integer scaled cardinal position.
For example, in a 3-d game, the Rook could move according to (k * _ for _ in RookOffsets), with k being an integer from 1 to board.size - 1
RookOffsets = [
(1, 0, 0),
(-1, 0, 0),
(0, 1, 0),
(0, -1, 0),
(0, 0, 1),
(0, 0, -1),
]- Pawn en passant.
- Castling.
- Add event listeners.