Extending weakly polynomial functions from high rank varieties
Abstract
Let be a field, a -vector space and be a subset of . A function is weakly polynomial of degree , if the restriction of on any affine subspace is a polynomial of degree . In this paper we consider the case when where is a complete intersection of bounded codimension defined by a high rank polynomials of degrees or and either is algebraically closed, or . We show that under these assumptions any -valued weakly polynomial function of degree on is a restriction of a polynomial of degree on . Our proof is based on Theorem 1.11 on fibers of polynomial morphisms of high rank. This result is of an independent interest. For example it immediately implies a strengthening of the result of [4].
Cite
@article{arxiv.1808.09439,
title = {Extending weakly polynomial functions from high rank varieties},
author = {David Kazhdan and Tamar Ziegler},
journal= {arXiv preprint arXiv:1808.09439},
year = {2019}
}
Comments
Some errors fixed. Paper is subsumed by arXiv:1902.00767