Encyclopedia > Fairy chess pieces

  Article Content

Fairy chess piece

Redirected from Fairy chess pieces

A fairy chess piece or unorthodox chess piece is a chess piece not used in conventional chess, but used in certain chess variants and some chess problems.

Table of contents

Classification of fairy pieces Most fairy pieces fall into one of three classes, although it should be noted that some are hybrid pieces (see the Chinese pieces, for example, which move as riders, but capture as hoppers) and others do not fall into this scheme at all:

Leapers

A leaper is a piece which moves a fixed distance and which can jump over any pieces between its departure and destination squares. The exact length that a leaper moves is usually expressed by giving the size of a rectangle with corners at the beginning and end square of a move. The knight in orthodox chess is, therefore, a (2,1) leaper - its moves are from corner to opposite corner of a rectangle with dimensions two squares by one square (note that it could also be described as a (1,2) leaper - there is no significance to the order of the numbers).

In shatranj, a forerunner to chess, the pieces which were later replaced by the bishop and queen were also leapers: the alfil was a (2,2) leaper, and the fers a (1,1) leaper (that is, it can move one square diagonally in any direction).

Some leapers can chose between several different lengths of move - the king in orthodox chess, for example, which can move one square in any direction, could be considered a (1,1) or (1,0) leaper.

Leapers are not able to effect pins, although they are often effective forking pieces.

Riders

A rider is a piece which can move an unlimited distance in one direction, providing there are no pieces in the way.

There are three riders in orthodox chess: the rook can move an unlimited number of (1,0) cells and is therefore a (1,0) rider; the bishop is a (1,1) rider; and the queen is a (1,1) or (1,0) rider.

The most popular fairy chess rider is the nightrider, which can make an unlimited number of knight moves (that is, 2,1 cells) in any direction (though, like other riders, it cannot change direction half-way through its move).

The names of riders are often obtained by taking the name of a leaper which moves a similar cell-size and adding the suffix rider. For example, the zebra is a (3,2) leaper, and the zebrarider is a (3,2) rider (though note that a knight (a (2,1) leaper) becomes a nightrider (without an initial K) not a knightrider.

Riders can pin pieces and effect skewers[?].

Hoppers

A hopper is a piece which moves by jumping over another piece (this intervening piece is called a hurdle). Unless it can jump over a piece, it cannot move.

There are no hoppers in orthodox chess, although in xiangqi, the cannon captures as a hopper (when not capturing, it is a rider).

The most popular hopper in fairy chess is the grasshopper, which moves along the same lines as an orthodox queen, except that it must hop over some other piece and land on the square immediately beyond it.

Note that hoppers generally capture by taking the piece on the destination square, not by taking the hurdle (as is the case in checkers). An exception is the locust.

Royal pieces A royal piece is one which cannot be allowed to be threatened with capture. If a royal piece is threatened with capture and cannot avoid capture next move, then the game is lost (this is checkmate). In orthodox chess, each side has one royal piece, the king. In fairy chess any other orthodox piece or fairy piece may instead be designated royal, there may be more than one royal piece, or there may no royal pieces at all (in which case the aim of the game must be something other than to deliver checkmate).

List of orthodox and fairy chess pieces

  • Alfil: a (2,2) leaper. Found in shatranj.
  • Amazon: a piece combining the powers of the queen and the knight.
  • Berolina pawn: a piece which moves one square diagonally forward (except on its first move, when it may move two), but captures by moving one square straight forward. Compare with pawn.
  • Bishop: a (1,1) rider. Found in orthodox chess.
  • Camel: a (3,1) leaper.
  • Cannon: see pao.
  • Cardinal: a piece combining the powers of bishop and knight. Also called a princess.
  • Chancellor: another name for the empress.
  • Chinese pieces: a collective name for the leo, mao, moa, pao and vao, so called because they are derived from the cannon in the Chinese form of chess, xiangqi.
  • Dabbabba: a (2,0) leaper.
  • Empress: a piece combining the powers of the rook and knight. Also called an chancellor.
  • Fers: a piece which can move one square in any direction diagonally; it can be considered a (1,1) leaper. Found in shatranj.
  • Giraffe: a (4,1) leaper.
  • Grasshopper: a hopper which moves along the same lines as a queen and lands on the square immediately beyond that of the hurdle. One of the most popular fairy pieces.
  • King: a piece which can move one square in any direction; it could be considered a (1,0) or (1,1) leaper. Found in orthodox chess, when it is royal. A non-royal piece which moves in this way is sometimes called a Mann.
  • Knight: a (2,1) leaper. Found in orthodox chess.
  • Knighted piece: any piece which, in addition to its normal powers, can move like a knight. For example, an amazon is a knighted queen.
  • Kraken: a piece which can leap to any square on the board, including the one it is currently on (leaping to the current square has the effect of passing a move). Compare with universal leaper.
  • Leo: a Chinese piece which combines the powers of the pao and vao; it is therefore a piece which moves like a queen when not capturing (that is, a (1,0) or (1,1) rider), but captures by leaping over an intervening piece and taking the piece on the leo's destination square (the captured piece can be any number of squares beyond the hurdle).
  • Lion: a hopper which moves along the same lines as a queen and which can land on a sqaure any distance beyond the hurdle.
  • Locust: any piece which captures by hopping over its victim (as in draughts).
  • Mao: a Chinese piece which moves like a knight except that it does not leap. It first moves one square orthoginally in any direction, and then continues in the same general direction one square diagonally. The square it is on after its orthogonal move must be vacant. For example, if a white mao is on b2 and there is a white pawn on b3, the mao cannot move to a4 or c4; if the pawn is on c3, however, it can move to both those squares (because the first part of the move is orthogonal, not diagonal).
  • Moa: as the mao, but the first step is diagonal and the second orthogonal, not the other way round.
  • Nightrider: A rider which moves any number of 2,1 cells (ie, knight moves) in the same direction). A nightrider on b2 on an empty board, therefore, can move to a4, c4, d5, e7, d3, f4, h5 and d1. A pawn of the opposing colour on d5 could be captured, but the nightrider could not move any further in that direction. A pawn on, for example, b3, would have no effect. One of the most popular fairy pieces.
  • Pao: a Chinese piece which moves like a rook when not capturing (that is, a (1,0) rider), but captures by leaping over an intervening piece and taking the piece on the pao's destination square (the captured piece can be any number of squares beyond the hurdle). Found in xiangqi (in which context it is normally known in English as a cannon).
  • Pawn: one of the pieces in orthodox chess which moves one square straight forward (except on its first move, when it may move two squares), but captures one square forward diagonally. Compare with Berolina pawn.
  • Princess: another name for the cardinal.
  • Queen: a (1,0) or (1,1) rider. Combines the powers of the bishop and rook. Found in orthodox chess.
  • Rook: a (1,0) rider. Found in orthodox chess.
  • Universal leaper: a piece which can leap to any square on the board apart from the one it is on. Compare with kraken.
  • Vao: a Chinese piece which moves like a bishop when not capturing (that is, a (1,1) rider), but captures by leaping over an intervening piece and taking the piece on the vao's destination square (the captured piece can be any number of squares beyond the hurdle).
  • Wazir: a piece which can move one square orthogonally in any direction; it can be considered a (1,0) leaper.
  • Zebra: a (3,2) leaper.

External link



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
David McReynolds

... Biographical Writings / 1994 - "Leaders From The 60's: A Biographical Sourcebook Of American Activism - David McReynolds" - Book by Larry Gara: Greenwood ...

 
 
 
This page was created in 23.3 ms