Asymptotics of principal evaluations of Schubert polynomials for layered permutations
Abstract
Denote by u(n) the largest principal specialization of the Schubert polynomial: u(n) := w ∈ Sn Sw(1,…,1) Stanley conjectured in [arXiv:1704.00851] that there is a limit n ∞ \, 1n2 u(n), and asked for a limiting description of permutations achieving the maximum u(n). Merzon and Smirnov conjectured in [arXiv:1410.6857] that this maximum is achieved on layered permutations. We resolve both Stanley's problems restricted to layered permutations.
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