Delta and Theta Operator Expansions

Abstract

We give an elementary symmetric function expansion for Mmγ e1 eλ and Mmγ e1 sλ when t=1 in terms of what we call γ-parking functions and lattice γ-parking functions. Here, F and are certain eigenoperators of the modified Macdonald basis and M=(1-q)(1-t). Our main results in turn give an elementary basis expansion at t=1 for symmetric functions of the form M Fe1 G J whenever F is expanded in terms of monomials, G is expanded in terms of the elementary basis, and J is expanded in terms of the modified elementary basis \ eλ\λ. Even the most special cases of this general Delta and Theta operator expression are significant; we highlight a few of these special cases. We end by giving an e-positivity conjecture for when t is not specialized, proposing that our objects can also give the elementary basis expansion in the unspecialized symmetric function.