On the parity conjecture for Hilbert schemes of points on threefolds

Abstract

Let Hilbd(A3) be the Hilbert scheme of d points in A3, and let Tz denote the tangent space to a point z ∈ Hilbd(A3). Okounkov and Pandharipande have conjectured that Tz and d have the same parity for every z. For points z parametrizing monomial ideals, the conjecture was proved by Maulik, Nekrasov, Okounkov, and Pandharipande. In this paper, we settle the conjecture for points z parametrizing homogeneous ideals. In fact, we state a generalization of the conjecture to Quot schemes of A3, and we prove it for points parametrizing graded modules.