解决n-queen难题
我刚刚解决了python中的nqueen问题。该解决方案输出了将n个皇后放置在nXn棋盘上的解决方案总数,但尝试使用n = 15需要一个多小时才能得到答案。任何人都可以看看代码,并给我提示加快这个程序......一个新手python程序员。
#!/usr/bin/env python2.7
##############################################################################
# a script to solve the n queen problem in which n queens are to be placed on
# an nxn chess board in a way that none of the n queens is in check by any other
#queen using backtracking'''
##############################################################################
import sys
import time
import array
solution_count = 0
def queen(current_row, num_row, solution_list):
if current_row == num_row:
global solution_count
solution_count = solution_count + 1
else:
current_row += 1
next_moves = gen_nextpos(current_row, solution_list, num_row + 1)
if next_moves:
for move in next_moves:
'''make a move on first legal move of next moves'''
solution_list[current_row] = move
queen(current_row, num_row, solution_list)
'''undo move made'''
solution_list[current_row] = 0
else:
return None
def gen_nextpos(a_row, solution_list, arr_size):
'''function that takes a chess row number, a list of partially completed
placements and the number of rows of the chessboard. It returns a list of
columns in the row which are not under attack from any previously placed
queen.
'''
cand_moves = []
'''check for each column of a_row which is not in check from a previously
placed queen'''
for column in range(1, arr_size):
under_attack = False
for row in range(1, a_row):
'''
solution_list holds the column index for each row of which a
queen has been placed and using the fact that the slope of
diagonals to which a previously placed queen can get to is 1 and
that the vertical positions to which a queen can get to have same
column index, a position is checked for any threating queen
'''
if (abs(a_row - row) == abs(column - solution_list[row])
or solution_list[row] == column):
under_attack = True
break
if not under_attack:
cand_moves.append(column)
return cand_moves
def main():
'''
main is the application which sets up the program for running. It takes an
integer input,N, from the user representing the size of the chessboard and
passes as input,0, N representing the chess board size and a solution list to
hold solutions as they are created.It outputs the number of ways N queens
can be placed on a board of size NxN.
'''
#board_size = [int(x) for x in sys.stdin.readline().split()]
board_size = [15]
board_size = board_size[0]
solution_list = array.array('i', [0]* (board_size + 1))
#solution_list = [0]* (board_size + 1)
queen(0, board_size, solution_list)
print(solution_count)
if __name__ == '__main__':
start_time = time.time()
main()
print(time.time()
没有找到相关结果
已邀请:
6 个回复
室邢
乐遣杀屎
蕉衫
郡豪靠暖
,以获得N-Queens问题的替代实现。届甸衬丝蚕
#!/bin/python # # TH @stackoverflow, 2016-01-20, "N Queens" with an O(1) time method to check whether the next queen is attacked # import sys board_size = int(sys.argv[1]) Attacked_H = { i:0 for i in range(0, board_size) } Attacked_DU = { i:0 for i in range(0, board_size*2) } Attacked_DD = { i:0 for i in range(-board_size, board_size) } def nqueen(B, N, row, col): if(row >= N): return 1 if(col >= N): print "board:n" + str.join("n", ["_|"*q + "Q|" + "_|"*(board_size - q - 1) for q in B]) return 0 B[col] = row if(0==(Attacked_H[row] + Attacked_DU[row+col] + Attacked_DD[row-col])): [Attacked_H[row], Attacked_DU[row+col], Attacked_DD[row-col]] = [ 1,1,1 ] nqueen(B, N, 0, col + 1) [Attacked_H[row], Attacked_DU[row+col], Attacked_DD[row-col]] = [ 0,0,0 ] nqueen(B, N, row + 1, col) nqueen(list(range(0, board_size)), board_size, 0, 0)捕暑句簿姓