Cotangent spaces and separating re-embeddings

Abstract

Given an affine algebra R=P/I, where P=K[x1,…,xn] is a polynomial ring over a field K and I is an ideal in P, we study re-embeddings of the affine scheme Spec(R), i.e., presentations R P'/I' such that P' is a polynomial ring in fewer indeterminates. To find such re-embeddings, we use polynomials fi in the ideal I which are coherently separating in the sense that they are of the form fi= zi - gi with an indeterminate zi which divides neither a term in the support of gi nor in the support of fj for j i. The possible numbers of such sets of polynomials are shown to be governed by the Gr\"obner fan of I. The dimension of the cotangent space of R at a K-linear maximal ideal is a lower bound for the embedding dimension, and if we find coherently separating polynomials corresponding to this bound, we know that we have determined the embedding dimension of R and found an optimal re-embedding.