Stable-limit partially symmetric Macdonald functions and parabolic flag Hilbert schemes
Abstract
The modified Macdonald functions Hμ are fundamental objects in modern algebraic combinatorics. Haiman showed that there is a correspondence between the (C*)2-fixed points Iμ of the Hilbert schemes Hilbn(C2) and the functions Hμ realizing a derived equivalence between (C*)2-equivariant coherent sheaves on Hilbn(C2) and (Sn × (C*)2)-equivariant coherent sheaves on (C2)n. Carlsson--Gorsky--Mellit introduced a larger family of smooth projective varieties PFHn,n-k called the parabolic flag Hilbert schemes. They showed that an algebra Bq,t, directly related to the double Dyck path algebra Aq,t employed in Carlsson--Mellit's proof of the Shuffle Theorem, acts naturally on the (C*)2-equivariant K-theory U of these spaces and, moreover, there is a Bq,t-isomorphism : U → V where V is the polynomial representation. The isomorphism : U → V is known to extend Haiman's correspondence. In this paper, we explicitly compute the images (Hμ,w) of the normalized (C*)2-fixed point classes Hμ,w of the spaces PFHn,n-k and show they agree with the modified partially symmetric Macdonald polynomials H(λ|γ) introduced by Goodberry-Orr, confirming their prior conjecture. We use this result to give an explicit formula for the action of the involution N on V.
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