Torus Queen Independence
Abstract
Define a queen on Znd with admissible moves parallel to x∈\-1,0,1\d, of arbitrary length. How many queens can be placed on Znd without any two in conflict? In two dimensions, this problem was initiated by Pólya in 1918 and resolved by Monsky in 1989. We give the first known impossibility result in d>2 dimensions, showing that a trivial upper bound nd-1 cannot be achieved if n is a multiple of 5 and not of 25. Moreover, we conjecture that nd-1-O(nd-2) queens can be placed independently, which we prove if n has no prime divisor less than 2 d/2 +1.
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