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Characterizations of the $d$th-power residue matrices over finite fields

Published 26 Sep 2018 in math.NT | (1809.10225v1)

Abstract: In a paper of the author with D. Dummit and H. Kisilevsky, we constructed a collection of matrices defined by quadratic residue symbols, termed "quadratic residue matrices", associated to the splitting behavior of prime ideals in a composite of quadratic extensions of $\mathbb{Q}$, and proved a simple criterion characterizing such matrices. We then analyzed the analogous classes of matrices constructed from the cubic and quartic residue symbols for a set of prime ideals of $\mathbb{Q}(\sqrt{-3})$ and $\mathbb{Q}(i)$, respectively. In this paper, the goal is to construct and study the finite-field analogues of these residue matrices, the "$d$th-power residue matrices", using the general $d$th-power residue symbol over a finite field.

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