A remark on the Chebotarev theorem about roots of unity

Details A remark on the Chebotarev theorem about roots of unity A remark on the Chebotarev theorem about roots of unity

2007-02-09

arxiv.org/abs/math/0702246v1

Mathematics

Number Theory

Scientific paper

Let $\Omega$ be a matrix with entries $a_{i,j}=\omega^{ij},$ $1\leq i,j \leq
n,$ where $\omega=e^{2\pi \sqrt{-1}/n},$ $n\in \mathbb N.$ The Chebotarev
theorem states that if $n$ is a prime then any minor of $\Omega$ is non-zero.
In this note we provide an analogue of this statement for composite $n.$

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