A counterexample to the parity conjecture

Abstract

Let [Z]∈Hilbd A3 be a zero-dimensional subscheme of the affine three-dimensional complex space of length d>0. Okounkov and Pandharipande have conjectured that the dimension of the tangent space of Hilbd A3 at [Z] and d have the same parity. The conjecture was proven by Maulik, Nekrasov, Okounkov and Pandharipande for points [Z] defined by monomial ideals and very recently by Ramkumar and Sammartano for homogeneous ideals. In this paper we exhibit a family of zero-dimensional schemes in Hilb12 A3, which disproves the conjecture in the general non-homogeneous case.