Toward Butler's conjecture

Donghyun Kim, Seung Jin Lee, Jaeseong Oh

Published 2022-12-19Version 1

For a partition $\nu$, let $\lambda,\mu\subseteq \nu$ be two distinct partitions such that $|\nu/\lambda|=|\nu/\mu|=1$. Butler conjectured that the divided difference $\operatorname{I}_{\lambda,\mu}[X;q,t]=(T_\lambda\widetilde{H}_\mu[X;q,t]-T_\mu\widetilde{H}_\lambda[X;q,t])/(T_\lambda-T_\mu)$ of modified Macdonald polynomials of two partitions $\lambda$ and $\mu$ is Schur positive. By introducing a new LLT equivalence called column exchange rule, we give a combinatorial formula for $\operatorname{I}_{\lambda,\mu}[X;q,t]$, which is a positive monomial expansion. We also prove Butler's conjecture for some special cases.