A flag variety for the Delta Conjecture

Abstract

The Delta Conjecture of Haglund, Remmel, and Wilson predicts the monomial expansion of the symmetric function 'ek-1 en, where k ≤ n are positive integers and 'ek-1 is a Macdonald eigenoperator. When k = n, the specialization 'en-1 en|t = 0 is the Frobenius image of the graded Sn-module afforded by the cohomology ring of the flag variety consisting of complete flags in Cn. We define and study a variety Xn,k which carries an action of Sn whose cohomology ring H(Xn,k) has Frobenius image given by 'ek-1 en|t = 0, up to a minor twist. The variety Xn,k has a cellular decomposition with cells Cw indexed by length n words w = w1 … wn in the alphabet \1, 2, …, k\ in which each letter appears at least once. When k = n, the variety Xn,k is homotopy equivalent to the flag variety. We give a presentation for the cohomology ring H(Xn,k) as a quotient of the polynomial ring Z[x1, …, xn] and describe polynomial representatives for the classes [ Cw] of the closures of the cells Cw; these representatives generalize the classical Schubert polynomials.