Package g2001_2100.s2056_number_of_valid_move_combinations_on_chessboard

Class Solution

  • All Implemented Interfaces:
    
public final class Solution

    2056 - Number of Valid Move Combinations On Chessboard.

    Hard

    There is an 8 x 8 chessboard containing n pieces (rooks, queens, or bishops). You are given a string array pieces of length n, where pieces[i] describes the type (rook, queen, or bishop) of the <code>i<sup>th</sup></code> piece. In addition, you are given a 2D integer array positions also of length n, where <code>positionsi = r<sub>i</sub>, c<sub>i</sub></code> indicates that the <code>i<sup>th</sup></code> piece is currently at the 1-based coordinate <code>(r<sub>i</sub>, c<sub>i</sub>)</code> on the chessboard.

    When making a move for a piece, you choose a destination square that the piece will travel toward and stop on.

    • A rook can only travel horizontally or vertically from (r, c) to the direction of (r+1, c), (r-1, c), (r, c+1), or (r, c-1).

    • A queen can only travel horizontally, vertically, or diagonally from (r, c) to the direction of (r+1, c), (r-1, c), (r, c+1), (r, c-1), (r+1, c+1), (r+1, c-1), (r-1, c+1), (r-1, c-1).

    • A bishop can only travel diagonally from (r, c) to the direction of (r+1, c+1), (r+1, c-1), (r-1, c+1), (r-1, c-1).

    You must make a move for every piece on the board simultaneously. A move combination consists of all the moves performed on all the given pieces. Every second, each piece will instantaneously travel one square towards their destination if they are not already at it. All pieces start traveling at the <code>0<sup>th</sup></code> second. A move combination is invalid if, at a given time, two or more pieces occupy the same square.

    Return the number of valid move combinations.

    Notes:

    • No two pieces will start in the same square.

    • You may choose the square a piece is already on as its destination.

    • If two pieces are directly adjacent to each other, it is valid for them to move past each other and swap positions in one second.

    Example 1:

    Input: pieces = "rook", positions = \[\[1,1]]

    Output: 15

    Explanation: The image above shows the possible squares the piece can move to.

    Example 2:

    Input: pieces = "queen", positions = \[\[1,1]]

    Output: 22

    Explanation: The image above shows the possible squares the piece can move to.

    Example 3:

    Input: pieces = "bishop", positions = \[\[4,3]]

    Output: 12

    Explanation: The image above shows the possible squares the piece can move to.

    Constraints:

    • n == pieces.length

    • n == positions.length

    • 1 &lt;= n &lt;= 4

    • pieces only contains the strings "rook", "queen", and "bishop".

    • There will be at most one queen on the chessboard.

    • <code>1 <= x<sub>i</sub>, y<sub>i</sub><= 8</code>

    • Each positions[i] is distinct.

    • Nested Class Summary

      Nested Classes 
      Modifier and Type Class Description

    • Field Summary

      Fields 
      Modifier and Type Field Description

    • Constructor Summary

      Constructors 
      Constructor Description
      Solution()

    • Enum Constant Summary

      Enum Constants 
      Enum Constant Description

    • Method Summary

      Modifier and Type Method Description
      final Integer countCombinations(Array<String> pieces, Array<IntArray> positions)

      • Methods inherited from class java.lang.Object

        clone, equals, finalize, getClass, hashCode, notify, notifyAll, toString, wait, wait, wait