Upper bounds of dual flagged Weyl characters
Abstract
For a subset D of boxes in an n× n square grid, let D(x) denote the dual character of the flagged Weyl module associated to D. It is known that D(x) specifies to a Schubert polynomial (resp., a key polynomial) in the case when D is the Rothe diagram of a permutation (resp., the skyline diagram of a composition). One can naturally define a lower and an upper bound of D(x). M\'esz\'aros, St. Dizier and Tanjaya conjectured that D(x) attains the upper bound if and only if D avoids a certain subdiagram. We provide a proof of this conjecture.
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