The commutant of divided difference operators, Klyachko's genus, and the comaj statistic

Abstract

In [Hamaker-Pechenik-Speyer-Weigandt, Nenashev, Pechenik-Weigandt] are studied certain operators on polynomials and power series that commute with all divided difference operators ∂i. We introduce a second set of "martial" operators i that generate the full commutant, and show how a Hopf-algebraic approach naturally reproduces the operators from [Nenashev]. We then pause to study Klyachko's homomorphism H*(Fl(n)) H*(the permutahedral toric variety), and extract the part of it relevant to Schubert calculus, the "affine-linear genus''. This genus is then re-obtained using Leibniz combinations of the i. We use Nadeau-Tewari's q-analogue of Klyachko's genus to study the equidistribution of and comaj on [n] k, generalizing known results on Sn.