Add to ORKGAn $n$-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 completed to an $n$-queens configuration. In this paper, we study an extremal aspect of this question, namely: how small must a partial configuration be so that a completion is always possible? We show that any placement of at most $n/60$ mutually non-attacking queens can be completed. We also provide partial configurations of roughly $n/4$ queens that cannot be completed, and formulate a number of interesting problems. Our proofs connect the queens problem to rainbow matchings in bipartite graphs and use probabi...
The n-queens problem is a generalization of the eight-queens problem of placing eight queens on a s...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The $n$-queens problem is to determine $\mathcal{Q}(n)$, the number of ways to place $n$ mutually no...
The classic n-queens problem asks for placements of just n mutually non-attacking queens on an n × n...
AbstractWe present some new solutions to the problem of arranging n queens on an n × n chessboard wi...
The famous n-queens problem asks how many ways there are to place n queens on an n × n chessboard so...
The n-queens problem is a generalization of the eight-queens problem of placing eight queens on a s...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The n-Queens problem is to place n chess queens on an n by n chessboard so that no two queens are on...
The $n$-queens problem is to determine $\mathcal{Q}(n)$, the number of ways to place $n$ mutually no...
The classic n-queens problem asks for placements of just n mutually non-attacking queens on an n × n...
AbstractWe present some new solutions to the problem of arranging n queens on an n × n chessboard wi...
The famous n-queens problem asks how many ways there are to place n queens on an n × n chessboard so...
The n-queens problem is a generalization of the eight-queens problem of placing eight queens on a s...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...
Given a regular chessboard, can you place eight queens on it, so that no two queens attack each othe...