A One-Variable Frame Construction For Irrational Components of Hilbert Schemes of Points

Abstract

Farkas, Pandharipande, and Sammartano constructed non-rational irreducible components of Hilbert schemes of points in affine space An for all n ≥ 12. Their construction starts from Hilbert schemes of curves in P3, adjoins two auxiliary variables in order to apply Jelisiejew's TNT frame construction, and then doubles the number of variables. We give a one-variable variant of the construction. The new input is a local-cohomology replacement for the depth-three step in Jelisiejew's negative tangent computation. It uses the vanishing of the low-degree Hartshorne--Rao module for the complete g39 curve source. As a consequence, over a field of characteristic zero, Hilb(An) has non-rational irreducible components for all n ≥ 10.