More elementary components of the Hilbert scheme of points

Abstract

Let K be an algebraically closed field of characteristic 0, and let Hμ denote the Hilbert scheme of μ points of the affine space An. An elementary component E of Hμ is an irreducible component such that every K-point [I] ∈ E represents a length-μ closed subscheme Spec(K[x1,…,xn]/I) ⊂eq An that is supported at one point. In a previous article we found some new examples of elementary components; in this article, we simplify the methods and extend the range of the previous paper to find several more examples. In addition, we present a "plausibility test" that suggests the existence of a vast number of similar examples.

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