Top-degree components of Grothendieck and Lascoux polynomials

Abstract

The Castelnuovo-Mumford polynomial Gw with w ∈ Sn is the highest homogeneous component of the Grothendieck polynomial Gw. Pechenik, Speyer and Weigandt define a statistic rajcode(·) on Sn that gives the leading monomial of Gw. We introduce a statistic rajcode(·) on any diagram D through a combinatorial construction ``snow diagram'' that augments and decorates D. When D is the Rothe diagram of a permutation w, rajcode(D) agrees with the aforementioned rajcode(w). When D is the key diagram of a weak composition α, rajcode(D) yields the leading monomial of Lα, the highest homogeneous component of the Lascoux polynomials Lα. We use Lα to construct a basis of Vn, the span of Gw with w ∈ Sn. Then we show Vn gives a natural algebraic interpretation of a classical q-analogue of Bell numbers.