Ordered set partitions and the 0-Hecke algebra

Abstract

Let the symmetric group Sn act on the polynomial ring Q[xn] = Q[x1, …, xn] by variable permutation. The coinvariant algebra is the graded Sn-module Rn := Q[xn] / In, where In is the ideal in Q[xn] generated by invariant polynomials with vanishing constant term. Haglund, Rhoades, and Shimozono introduced a new quotient Rn,k of the polynomial ring Q[xn] depending on two positive integers k ≤ n which reduces to the classical coinvariant algebra of the symmetric group Sn when k = n. The quotient Rn,k carries the structure of a graded Sn-module; Haglund et. al. determine its graded isomorphism type and relate it to the Delta Conjecture in the theory of Macdonald polynomials. We introduce and study a related quotient Sn,k of F[xn] which carries a graded action of the 0-Hecke algebra Hn(0), where F is an arbitrary field. We prove 0-Hecke analogs of the results of Haglund, Rhoades, and Shimozono. In the classical case k = n, we recover earlier results of Huang concerning the 0-Hecke action on the coinvariant algebra.