Maximum arrangements of nonattacking kings on the 2n× 2n chessboard

Abstract

To count the number of maximum independent arrangements of n2 kings on a 2n× 2n chessboard, we build a 2n × (n+1) matrix whose entries are independent arrangements of n kings on 2× 2n rectangles. Utilizing upper and lower bound functions dependent of the entries of the matrix, we recursively construct independent solutions, and provide a straight-forward formula and algorithm.