Cyclage, catabolism, and the affine Hecke algebra

TL;DR

This paper introduces a new subalgebra of the affine Hecke algebra, explores its cellular structure, and connects it to combinatorial objects like tableaux, with conjectures on its filtration and relations to existing combinatorial theories.

Contribution

It identifies a subalgebra  of the affine Hecke algebra, develops its cellular structure, and links it to positive affine tableaux and known combinatorial modules, proposing new conjectures.

Findings

Identification of subalgebra  with a canonical basis.

Labeling of left cells by positive affine tableaux.

Conjectural cellular filtration related to existing combinatorial modules.

Abstract

We identify a subalgebra \pH_n of the extended affine Hecke algebra \eH_n of type A. The subalgebra \pH_n is a \u-analogue of the monoid algebra of \S_n \ltimes \ZZ_{\geq 0}^n and inherits a canonical basis from that of \eH_n. We show that its left cells are naturally labeled by tableaux filled with positive integer entries having distinct residues mod n, which we term \emph{positive affine tableaux} (PAT). We then exhibit a cellular subquotient \R_{1^n} of \pH_n that is a \u-analogue of the ring of coinvariants \CC[y_1,...,y_n]/(e_1,...,e_n) with left cells labeled by PAT that are essentially standard Young tableaux with cocharge labels. Multiplying canonical basis elements by a certain element \pi \in \pH_n corresponds to rotations of words, and on cells corresponds to cocyclage. We further show that \R_{1^n} has cellular quotients \R_\lambda that are \u-analogues of the Garsia-Procesi modules R_\lambda with left cells labeled by (a PAT version of) the \lambda-catabolizable tableaux. We give a conjectural description of a cellular filtration of \pH_n, the subquotients of which are isomorphic to dual versions of \R_\lambda under the perfect pairing on \R_{1^n}. We conjecture how this filtration relates to the combinatorics of the cells of \eH_n worked out by Shi, Lusztig, and Xi. We also conjecture that the k-atoms of Lascoux, Lapointe, and Morse and the R-catabolizable tableaux of Shimozono and Weyman have cellular counterparts in \pH_n. We extend the idea of atom copies of Lascoux, Lapoint, and Morse to positive affine tableaux and give descriptions, mostly conjectural, of some of these copies in terms of catabolizability.