Hall-Littlewood polynomials and a Hecke action on ordered set partitions
Abstract
We construct an action of the Hecke algebra Hn(q) on a quotient of the polynomial ring F[x1, …, xn], where F = Q(q). The dimension of our quotient ring is the number of k-block ordered set partitions of \1, 2, …, n \. This gives a quantum analog of a construction of Haglund-Rhoades-Shimozono and interpolates between their result at q = 1 and work of Huang-Rhoades at q = 0.
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