# Solving the n-queen puzzle

I have just solved the nqueen problem in python. The solution outputs the total number of solutions for placing n queens on an nXn chessboard but trying it with n=15 takes more than an hour to get an answer. Can anyone take a look at the code and give me tips on speeding up this program...... A novice python programmer.

``````#!/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)
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 = 
board_size = board_size
solution_list = array.array('i', * (board_size + 1))
#solution_list =  * (board_size + 1)
queen(0, board_size, solution_list)
print(solution_count)

if __name__ == '__main__':
start_time = time.time()
main()
print(time.time()
``````
• You do realize that your algorithm is O(N!), right? There's no reason to believe you'll get anything more than a constant factor squeezed out of it. Jan 27 '11 at 15:29
• Didn't check it, but wiki says there are 45k solutions for n = 14. Since it's an expotential increase, you can bet it's even more for n = 15. That will take a while, regardless of the algorithm (even with an optimal algorithm, this is a complex problem - and yours is propably not optimal). Try for a much smaller n (say, 8).
– user395760
Jan 27 '11 at 15:33
• durangobill.com/N_Queens.html contains numbers of solutions up to N=26.
– 9000
Jan 27 '11 at 17:31
• In case anyone is wondering, I did the math. With it taking 60m, the average time to compute a single correct solution with N=15 (2,279,184 correct solutions) is 1.579513ms. Jan 27 '11 at 17:45

The backtracking algorithm to the N-Queens problem is a factorial algorithm in the worst case. So for N=8, 8! number of solutions are checked in the worst case, N=9 makes it 9!, etc. As can be seen, the number of possible solutions grows very large, very fast. If you don't believe me, just go to a calculator and start multiplying consecutive numbers, starting at 1. Let me know how fast the calculator runs out of memory.

Fortunately, not every possible solution must be checked. Unfortunately, the number of correct solutions still follows a roughly factorial growth pattern. Thus the running time of the algorithm grows at a factorial pace.

Since you need to find all correct solutions, there's really not much that can be done about speeding up the program. You've already done a good job in pruning impossible branches from the search tree. I don't think there's anything else that will have a major effect. It's simply a slow algorithm.

The number of solutions can be estimated using Donald Knuth's randomised estimation method.

Starting from no queens placed the number of allowed positions for the next row is n. Randomly pick one of the positions and calculate the number of allowed positions (p) for the next row and multiple this by n and store it as the total number of solutions (total = n * p) , then randomly choose one of the allowed positions.

For this row calculate the number of allowed positions (p) for the next row and mutiple the total number of solutions by this (total *= p). Repeat this until either the board cannot be solved, in which case the number of solutions equals zero, or until the board is solved.

Repeat this many times and calculate the average number of solutions (including any zeros). This should give you a quick and pretty accurate approximation of the number of solutions with the approximation improving the more runs you do.

I hope this makes sense ;)

I would suggest you peek at the `test_generators.py` from the Python source for an alternative implementation of the N-Queens problem.

``````Python 2.6.5 (release26-maint, Sep 12 2010, 21:32:47)
[GCC 4.4.3] on linux2
>>> from test import test_generators as tg
>>> n= tg.Queens(15)
>>> s= n.solve()
>>> next(s)
[0, 2, 4, 1, 9, 11, 13, 3, 12, 8, 5, 14, 6, 10, 7]
>>> next(s)
[0, 2, 4, 6, 8, 13, 11, 1, 14, 7, 5, 3, 9, 12, 10]
``````

Just saw this question. I'd like to contribute 2 solutions.

Feedback is appreciated. Cheers

Below is my PYTHON implementation. You might want to use PYPY for more speed.

Its speed is helped by using an O(1) time method to check whether the next queen is attacked by those already placed on the board.

Assuming the program is "nqueen.py", an example to run it is "python nqueen.py 6", where 6 is the size of a 6x6 board.

``````#!/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)
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)
``````

We can solve n-queens with genetic algorithms too. This is described here https://youtu.be/l6qll5OldHQ, in one of the lectures of the edX course ColumbiaX: CSMM.101x Artificial Intelligence (AI).

The objective function tries to optimize number of non-attacking pairs of queens. The animation below shows an example solution in R with n=20. Further details on how to solve n-queens with genetic algorithms can be found here: https://sandipanweb.wordpress.com/2017/03/09/solving-the-n-queen-puzzle-with-genetic-algorithm-in-r/?frame-nonce=76cf9b156a. 