$K$-theoretic Catalan functions
Abstract
We prove that the --Schur functions are part of a family of inhomogenous symmetric functions whose top homogeneous components are Catalan functions, the Euler characteristics of certain vector bundles on the flag variety. Lam-Schilling-Shimozono identified the --Schur functions as Schubert representatives for -homology of the affine Grassmannian for SL. Our perspective reveals that the --Schur functions satisfy a shift invariance property, and we deduce positivity of their branching coefficients from a positivity result of Baldwin and Kumar. We further show that a slight adjustment of our formulation for --Schur functions produces a second shift-invariant basis which conjecturally has both positive branching and a rectangle factorization property. Building on work of Ikeda-Iwao-Maeno, we conjecture that this second basis gives the images of the Lenart-Maeno quantum Grothendieck polynomials under a -theoretic analog of the Peterson isomorphism.
Keywords
Cite
@article{arxiv.2010.01759,
title = {$K$-theoretic Catalan functions},
author = {Jonah Blasiak and Jennifer Morse and George H. Seelinger},
journal= {arXiv preprint arXiv:2010.01759},
year = {2020}
}
Comments
24 pages