$(σ, τ)$-Derivations of Number Rings with Coding Theory Applications
Praveen Manju, Rajendra Kumar Sharma
Abstract
In this article, we study $(σ, τ)$-derivations of number rings by considering them as commutative unital $\mathbb{Z}$-algebras. We begin by characterizing all $(σ, τ)$-derivations and inner $(σ, τ)$-derivations of the ring of algebraic integers of a quadratic number field. Then we characterize all $(σ, τ)$-derivations of the ring of algebraic integers $\mathbb{Z}[ζ]$ of a $p^{\text{th}}$-cyclotomic number field $\mathbb{Q}(ζ)$ ($p$ odd rational prime and $ζ$ a primitive $p^{\text{th}}$-root of unity). We also conjecture (using SageMath and MATLAB) an \enquote{if and only if} condition for a $(σ, τ)$-derivation $D$ on $\mathbb{Z}[ζ]$ to be inner. We further characterize all $(σ, τ)$-derivations and inner $(σ, τ)$-derivations of the bi-quadratic number ring $\mathbb{Z}[\sqrt{m}, \sqrt{n}]$ ($m$, $n$ distinct square-free rational integers). In each of the above cases, we also determine the rank and an explicit basis of the derivation algebra consisting of all $(σ, τ)$-derivations of the number ring. As a consequence, we solve the twisted derivation problem in the ring of algebraic integers of a quadratic number field and in a bi-quadratic number ring, and we conjecture a solution of the twisted derivation problem in the ring of algebraic integers of a $p^{\text{th}}$-cyclotomic number field. Finally, we give the applications of our work in coding theory by constructing Hom-IDD codes.