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Related papers: On the Complexity of a Derivative Chess Problem

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Using modular arithmetic of the ring $\mathbb{Z}_{n+1}$ we obtain a new short solution to the problem of existence of at least one solution to the $N$-Queens problem on an $N \times N$ chessboard. It was proved, that these solutions can be…

Combinatorics · Mathematics 2018-05-21 Dmitrii Mikhailovskii

We consider the classical $n$-queens problem, which asks how many ways one can place $n$ mutually non-attacking queens on an $n$ x $n$ chessboard. We prove that the total number of solutions to the $n$-queens problem $Q(n)$ is divisible by…

Combinatorics · Mathematics 2026-01-12 Hugo Nielsen

The N-queens problem is to find the position of N queens on an N by N chess board such that no queens attack each other. The excluded diagonals N-queens problem is a variation where queens cannot be placed on some predefined fields along…

Quantum Physics · Physics 2019-06-05 Valentin Torggler , Philipp Aumann , Helmut Ritsch , Wolfgang Lechner

An $n$-queens configuration is a placement of $n$ mutually non-attacking queens on an $n\times n$ chessboard. The $n$-queens completion problem, introduced by Nauck in 1850, is to decide whether a given partial configuration can be…

Combinatorics · Mathematics 2022-06-01 Stefan Glock , David Munhá Correia , Benny Sudakov

Quantum computers can potentially solve problems that are computationally intractable on a classical computer in polynomial time using quantum-mechanical effects such as superposition and entanglement. The N-Queens Problem is a notable…

How many mutually non-attacking queens can be placed on a d-dimensional chessboard of size n? The n-queens problem in higher dimensions is a generalization of the well-known n-queens problem. We provide a comprehensive overview of…

Optimization and Control · Mathematics 2024-06-11 Tim Kunt

Parts I-IV showed that the number of ways to place $q$ nonattacking queens or similar chess pieces on an $n\times n$ chessboard is a quasipolynomial function of $n$ whose coefficients are essentially polynomials in $q$. For partial queens,…

Combinatorics · Mathematics 2021-06-16 Seth Chaiken , Christopher R. H. Hanusa , Thomas Zaslavsky

We study different domination problems of attacking and non-attacking rooks and queens on polyominoes and polycubes of all dimensions. Our main result proves that maximum independent domination is NP-complete for non-attacking queens and…

Combinatorics · Mathematics 2025-03-26 Alexis Langlois-Rémillard , Mia Müßig , Érika Róldan

In this paper, we derive simple closed-form expressions for the $n$-queens problem and three related problems in terms of permanents of $(0,1)$ matrices. These formulas are the first of their kind. Moreover, they provide the first method…

Discrete Mathematics · Computer Science 2017-04-11 Kevin Pratt

How many mutually non-attacking queens can be placed on a d-dimensional chessboard of size n? The n-queens problem in higher dimensions is a generalization of the well-known n-queens problem. We present an integer programming formulation of…

Optimization and Control · Mathematics 2024-10-24 Tim Kunt

In this work, we have introduced two innovative quantum algorithms: the Direct Column Algorithm and the Quantum Backtracking Algorithm to solve N-Queens problem, which involves the arrangement of $N$ queens on an $N \times N$ chessboard…

Quantum Physics · Physics 2023-12-29 Santhosh G S , Piyush Joshi , Ayan Barui , Prasanta K. Panigrahi

A linear algorithm is described for solving the n-Queens Completion problem for an arbitrary composition of k queens, consistently distributed on a chessboard of size n x n. Two important rules are used in the algorithm: a) the rule of…

Artificial Intelligence · Computer Science 2020-01-01 E. Grigoryan

We apply to the $n\times n$ chessboard the counting theory from Part I for nonattacking placements of chess pieces with unbounded straight-line moves, such as the queen. Part I showed that the number of ways to place $q$ identical…

Combinatorics · Mathematics 2016-10-18 Seth Chaiken , Christopher R. H. Hanusa , Thomas Zaslavsky

The Queen's Domination problem, studied for over 160 years, poses the following question: What is the least number of queens that can be arranged on a $m \times n$ chessboard so that they either attack or occupy every cell? We propose a…

Combinatorics · Mathematics 2023-04-14 Archit Karandikar , Akashnil Dutta

In Parts I-III we showed that the number of ways to place $q$ nonattacking queens or similar chess pieces on an $n\times n$ chessboard is a quasipolynomial function of $n$ whose coefficients are essentially polynomials in $q$. In this part…

Combinatorics · Mathematics 2021-06-16 Seth Chaiken , Christopher R. H. Hanusa , Thomas Zaslavsky

We apply our geometrical theory for counting placements of $q$ nonattacking on an $n\times n$ chessboard, from Parts~I and II, to partial queens: that is, chess pieces with any combination of horizontal, vertical, and $45^\circ$-diagonal…

Combinatorics · Mathematics 2021-06-21 Seth Chaiken , Christopher R. H. Hanusa , Thomas Zaslavsky

The $n$-queens puzzle is to place $n$ mutually non-attacking queens on an $n \times n$ chessboard. We present a simple two stage randomized algorithm to construct such configurations. In the first stage, a random greedy algorithm constructs…

Combinatorics · Mathematics 2021-07-12 Zur Luria , Michael Simkin

A well-known chessboard problem is that of placing eight queens on the chessboard so that no two queens are able to attack each other. (Recall that a queen can attack anything on the same row, column, or diagonal as itself.) This problem is…

Combinatorics · Mathematics 2007-12-17 Jeremiah Barr , Shrisha Rao

We show the chess billiard map, which was introduced in [HM] in order to study a generalization of the $n$-Queens problem in chess, is a circle homeomorphism. We give a survey of some of the known results on circle homeomorphisms, and apply…

Dynamical Systems · Mathematics 2020-07-30 Arnaldo Nogueira , Serge Troubetzkoy

We introduce a two player game on an n x n chessboard where queens are placed by alternating turns on a chessboard square whose availability is determined by the number of queens already on the board which can attack that square modulo two.…

Combinatorics · Mathematics 2015-10-13 Tricia Muldoon Brown , Abrahim Ladha
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