Hilbert schemes, polygraphs, and the Macdonald positivity conjecture
Abstract
We study the isospectral Hilbert scheme Xn, defined as the reduced fiber product of C2n with the Hilbert scheme Hn of points in the plane, over the symmetric power Sn C2. We prove that Xn is normal, Cohen-Macaulay, and Gorenstein, and hence flat over Hn. We derive two important consequences. (1) We prove the strong form of the "n! conjecture" of Garsia and the author, giving a representation-theoretic interpretation of the Kostka-Macdonald coefficients Klambda,mu(q,t). This establishes the Macdonald positivity conjecture, that Klambda,mu(q,t) is always a polynomial with non-negative integer coefficients. (2) We show that the Hilbert scheme Hn is isomorphic to the Hilbert scheme of orbits C2n//Sn, in such a way that Xn is identified with the universal family over C2n//Sn.
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