A Permutation Avoidance Game with Reverse Replies and Monotone Traps
Abstract
We study the impartial game PAP (``permutations avoiding patterns''), in which players take turns choosing patterns to avoid. We define a set of length k patterns, Bk, and show that it is the unique minimal monotone-forcing subset of Sk: every sufficiently long permutation that avoids Bk is monotone, and every monotone-forcing subset of Sk must contain Bk. We prove a quadratic upper bound for the monotone-forcing threshold, and determine the exact thresholds for k=3,4,5,6. We use properties of the sets Bk to prove that a reverse-reply strategy wins PAP on Sn when k=4 for all n ≥ 10; for k=3, the same strategy can be analysed directly. We conjecture that it is a winning strategy for all k and n sufficiently large.
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