Counting $N$ Queens

Nick Polson, Vadim Sokolov
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Abstract

Gauss proposed the problem of how to enumerate the number of solutions for placing $N$ queens on an $N\times N$ chess board, so no two queens attack each other. The N-queen problem is a classic problem in combinatorics. We describe a variety of Monte Carlo (MC) methods for counting the number of solutions. In particular, we propose a quantile re-ordering based on the Lorenz curve of a sum that is related to counting the number of solutions. We show his approach leads to an efficient polynomial-time solution. Other MC methods include vertical likelihood Monte Carlo, importance sampling, slice sampling, simulated annealing, energy-level sampling, and nested-sampling. Sampling binary matrices that identify the locations of the queens on the board can be done with a Swendsen-Wang style algorithm. Our Monte Carlo approach counts the number of solutions in polynomial time.
数出 N$ 皇后
高斯提出了这样一个问题:如何枚举出在一个 N 次 N 元的棋盘上摆放 N 个皇后的解的个数,从而避免两个皇后互相攻击。N 皇后问题是组合数学中的一个经典问题。我们介绍了各种计算解数的蒙特卡罗(MC)方法。特别是,我们提出了一种基于洛伦兹曲线的量子重排序方法,它与计算解的数量有关。我们证明了他的方法能带来高效的多项式时间解决方案。其他 MC 方法包括理论似然蒙特卡罗、重要性采样、切片采样、模拟嵌套、能量级采样和嵌套采样。对确定棋盘上皇后位置的二进制矩阵进行采样,可采用斯文森-旺(Swendsen-Wang)式算法。我们的蒙特卡罗方法可以在多项式时间内计算出解决方案的数量。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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