Permutations of counters on a table
Abstract
We consider a game in which a blindfolded player attempts to set n counters lying on the vertices of a rotating regular n-gon table simultaneously to 0. When the counters countm we simplify the argument of Bar Yehuda, Etzion, and Moran (1993) showing that the player can win if and only if n = 1, m = 1, or (n, m) = (pa, pb) for some prime p and a, b ∈ N. We broadly generalize the result to the setting where the counters can be permuted by any element of a subset of the symmetric group S ⊂eq Sn, with the original formulation corresponding to S = Zn (rotations of the table).
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