Cotangent spaces and separating re-embeddings
Abstract
Given an affine algebra , where is a polynomial ring over a field and is an ideal in , we study re-embeddings of the affine scheme , i.e., presentations such that is a polynomial ring in fewer indeterminates. To find such re-embeddings, we use polynomials in the ideal which are coherently separating in the sense that they are of the form with an indeterminate which divides neither a term in the support of nor in the support of for . The possible numbers of such sets of polynomials are shown to be governed by the Gr\"obner fan of . The dimension of the cotangent space of at a -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 and found an optimal re-embedding.
Cite
@article{arxiv.2010.08378,
title = {Cotangent spaces and separating re-embeddings},
author = {Martin Kreuzer and Le Ngoc Long and Lorenzo Robbiano},
journal= {arXiv preprint arXiv:2010.08378},
year = {2021}
}
Comments
16 pages; paper streamlined and references added; to appear in JAA (2022)