Schur-Concavity for Avoidance of Increasing Subsequences in Block-Ascending Permutations
Abstract
For integers a1, …, an 0 and k 1, let Lk+2(a1, …, an) denote the set of permutations of \1, …, a1+…+an\ whose descent set is contained in \a1, a1+a2, …, a1+…+an-1\, and which avoids the pattern 12…(k+2). We exhibit some bijections between such sets, most notably showing that \# Lk+2 (a1, …, an) is symmetric in the ai and is in fact Schur-concave. This generalizes a set of equivalences observed by Mei and Wang.
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