Bialynicki-Birula schemes in higher dimensional Hilbert schemes of points and monic functors

Abstract

The Bialynicki-Birula strata on the Hilbert scheme Hn(Ad) are smooth in dimension d=2. We prove that there is a schematic structure in higher dimensions, the Bialynicki-Birula scheme, which is natural in the sense that it represents a functor. Let i:Hn(Ad)→ Symn(A1) be the Hilbert-Chow morphism of the ith coordinate. We prove that a Bialynicki-Birula scheme associated with an action of a torus T is schematically included in the fiber i-1(0) if the ith weight of T is non-positive. We prove that the monic functors parametrizing families of ideals with a prescribed initial ideal are representable.