Proof of a K-theoretic polynomial conjecture of Monical, Pechenik, and Searles

Abstract

As part of a program to develop K-theoretic analogues of combinatorially important polynomials, Monical, Pechenik, and Searles (2021) proved two expansion formulas Aa = Σb Qba(β)Pb and Qa = Σb Mba(β)Fb, where each of Aa, Pa, Qa and Fa is a family of polynomials that forms a basis for Z[x1,…,xn][β] indexed by weak compositions a, and Qba(β) and Mba(β) are monomials in β for each pair (a,b) of weak compositions. The polynomials Aa are the Lascoux atoms, Pa are the kaons, Qa are the quasiLascoux polynomials, and Fa are the glide polynomials; these are respectively the K-analogues of the Demazure atoms Aa, the fundamental particles Pa, the quasikey polynomials Qa, and the fundamental slide polynomials Fa. Monical, Pechenik, and Searles conjectured that for any fixed a, Σb Qba(-1), Σb Mba(-1) ∈ \0,1\, where b ranges over all weak compositions. We prove this conjecture using a sign-reversing involution.