Components of Gr\"obner strata in the Hilbert scheme of points

Abstract

We fix the lexicographic order on the polynomial ring S=k[x1,...,xn] over a ring k. We define S/k, the moduli space of reduced Gr\"obner bases with a given finite standard set , and its open subscheme ,S/k, the moduli space of families of # points whose attached ideal has the standard set . We determine the number of irreducible and connected components of the latter scheme; we show that it is equidimensional over Spec\,k; and we determine its relative dimension over Spec k. We show that analogous statements do not hold for the scheme S/k. Our results prove a version of a conjecture by Bernd Sturmfels.