K-analogues of Hivert's divided difference operators

Abstract

Several families of polynomials of combinatorial and representation theoretic interest (notably the Schur polynomials sλ, Demazure characters Da, and Demazure atoms Aa) can be defined in terms of divided difference operators. Hivert (2000) defines "fundamental analogues" of these divided difference operators, and Hivert and Hicks-Niese show in arXiv:2406.02420 that the polynomials that arise from those fundamental operators in analogous ways to the three families of polynomials above are respectively the fundamental quasisymmetric functions Fa from (1984), the fundamental slides Fa of Assaf and Searles from arXiv:1603.09744, and the fundamental particles Pa of Searles from arXiv:1707.01172. Lascoux (2001) defines K-analogues of the divided difference operators, and in arXiv:1908.07364, Buciumas, Scrimshaw, and Weber show that the polynomials arising in corresponding ways from the K-theoretic divided difference operators are respectively the Grothendieck polynomials sλ, the combinatorial Lascoux polynomials Da from arXiv:1611.08777, and the combinatorial Lascoux atoms Aa from arXiv:1611.08777, as conjectured by Monical in arXiv:1611.08777. We define K-analogues of Hivert's fundamental divided difference operators and show that the polynomials arising in the corresponding ways from our new operators are respectively the multifundamentals Fa of Lam and Pylyavskyy from arXiv:0705.2189, the fundamental glides Fa from of Pechenik and Searles from arXiv:1611.02545, and the kaons Pa of Monical, Pechenik, and Searles from arXiv:1806.03802.