English

Spaces with Vanishing Characteristic Coefficients

Rings and Algebras 2024-03-21 v1 Number Theory

Abstract

We prove that the maximal dimension of a subspace VV of the generic tensor product of mm symbol algebras of prime degree pp with Tr(vp1)=0\operatorname{Tr}(v^{p-1})=0 for all vVv\in V is p2m1p1\frac{p^{2m}-1}{p-1}. The same upper bound is thus obtained for VV with Tr(v)=Tr(v2)==Tr(vp1)=0\operatorname{Tr}(v)=\operatorname{Tr}(v^2)=\dots=\operatorname{Tr}(v^{p-1})=0 for all vVv \in V. We make use of the fact that for any subset SS of Fp××Fpn times\underbrace{\mathbb{F}_p \times \dots \times \mathbb{F}_p}_{n \ \text{times}} of S>pn1p1|S| > \frac{p^{n}-1}{p-1}, for all uVu\in V there exist v,wSv,w\in S and k[ ⁣[0,p1] ⁣]k\in [\![0,p-1]\!] such that kv+(p1k)w=ukv+(p-1-k)w=u.

Cite

@article{arxiv.2403.13080,
  title  = {Spaces with Vanishing Characteristic Coefficients},
  author = {Adam Chapman},
  journal= {arXiv preprint arXiv:2403.13080},
  year   = {2024}
}
R2 v1 2026-06-28T15:26:23.089Z