On embedding of linear hypersurfaces
Abstract
Linear hypersurfaces over a field have been playing a central role in the study of some of the challenging problems on affine spaces. Breakthroughs on such problems have occurred by examining two difficult questions on linear polynomials of the form : (i) Whether defines a closed embedding of into , i.e., whether the affine variety defined by is isomorphic to . (ii) If defines a closed embedding then whether is a coordinate in . Question (i) connects to the Characterization Problem of identifying affine spaces among affine varieties; Question (ii) is a special case of the formidable Embedding Problem for affine spaces. In their earlier work the first two authors had addressed these questions when is a monomial of the form ; and is of a certain type. In this paper, using -theory and -actions, we address these questions for a wider family of linear varieties. In particular, we obtain certain families of higher dimensional hyperplanes satisfying the Abhyankar Sathaye conjecture on the Embedding problem. For instance, we show that when the characteristic of is zero, and defines a hyperplane, then is a coordinate in along with . Our results in arbitrary characteristic yield counterexamples to the Zariski Cancellation Problem in positive characteristic.
Cite
@article{arxiv.2405.07205,
title = {On embedding of linear hypersurfaces},
author = {Parnashree Ghosh and Neena Gupta and Ananya Pal},
journal= {arXiv preprint arXiv:2405.07205},
year = {2024}
}
Comments
This is latest version of the previous article named: On Epimorphism and related problem for linear hypersurfaces