Construction of the moduli space of reduced Groebner bases

Abstract

For a given monomial ideal J ⊂ k[x1, …, xn] and a given monomial order , the moduli functor of all reduced Gr\"obner bases with respect to whose initial ideal is J is determined. In some cases, such a functor is representable by an affine scheme of finite type over k, and a locally closed subfunctor of a Hilbert scheme. The moduli space is called the Gr\"obner basis scheme, the Gr\"obner strata and so on if it exists. This paper introduces an alternative procedure for explicitly constructing a defining ideal of the Gr\"obner basis scheme and its Zariski tangent spaces by studying combinatorics on the standard set associated to J. That is a generalization of Robbiano and Lederer's technique. We also see that we can make an implementation of that. Moreover, as a generalization of Robbiano's result, we show that if the Gr\"obner basis scheme for and J defined over the rational numbers Q is nonsingular at the Q-rational point corresponding to J, then the Gr\"obner basis scheme for and J defined over any commutative ring k is isomorphic to an affine space over k.