A geometric interpretation of the Delta Conjecture

Abstract

We introduce a variety Yn,k, which we call the affine -Springer fiber, generalizing the affine Springer fiber studied by Hikita, whose Borel-Moore homology has an Sn action and a bigrading that corresponds to the Delta Conjecture symmetric function revq\,ω 'ek-1en under the Frobenius character map. We similarly provide a geometric interpretation for the Rational Shuffle Theorem in the integer slope case (km,k). The variety Yn,k has a map to the affine Grassmannian whose fibers are the -Springer fibers introduced by Levinson, Woo, and the third author. Part of our proof of our geometric realization relies on our previous work on a Schur skewing operator formula relating the Rational Shuffle Theorem to the Delta Conjecture.

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