On a refinement of Wilf-equivalence for permutations
Abstract
Recently, Dokos et al. conjectured that for all k, m≥ 1, the patterns 12… k(k+m+1)… (k+2)(k+1) and (m+1)(m+2)… (k+m+1)m… 21 are maj-Wilf-equivalent. In this paper, we confirm this conjecture for all k≥ 1 and m=1. In fact, we construct a descent set preserving bijection between 12… k (k-1) -avoiding permutations and 23… k1-avoiding permutations for all k≥ 3. As a corollary, our bijection enables us to settle a conjecture of Gowravaram and Jagadeesan concerning the Wilf-equivalence for permutations with given descent sets.
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