Closed k-Schur Katalan functions as K-homology Schubert representatives of the affine Grassmannian

Abstract

Recently, Blasiak-Morse-Seelinger introduced symmetric functions called Katalan functions, and proved that the K-theoretic k-Schur functions due to Lam-Schilling-Shimozono form a subfamily of the Katalan functions. They conjectured that another subfamily of Katalan functions called the closed k-Schur Katalan functions are identified with the Schubert structure sheaves in the K-homology of the affine Grassmannian. The main result is a proof of the conjecture. We also study a K-theoretic Peterson isomorphism that Ikeda, Iwao, and Maeno constructed, in a non-geometric manner, based on the unipotent solution of the relativistic Toda lattice of Ruijsenaars. We prove that the map sends a Schubert class of the quantum K-theory ring of the flag variety to a closed K-k-Schur Katalan function up to an explicit factor related to a translation element with respect to an anti-dominant coroot. In fact, we prove the above map coincides with a map whose existence was conjectured by Lam, Li, Mihalcea, Shimozono, and proved by Kato, and more recently by Chow and Leung.