Permutations with exactly one copy of a decreasing pattern of length k

Abstract

We construct an injection from the set of permutations of length n that contain exactly one copy of the decreasing pattern of length k to the set of permutations of length n+2 that avoid that pattern. We then prove that the generating function counting the former is not rational, and in the case when k is even and k≥ 4, it is not even algebraic. We extend our injection and our nonrationality result to a larger class of patterns.

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