Twisted Derivations in Algebraic Number Fields
Abstract
Let be a commutative ring with unity and be an integral extension of . Assume that is an integral domain with quotient field and is the minimal splitting field of over . Suppose are two different ring homomorphisms that fix element-wise. In this article, we classify all -linear maps which are -derivations. Consequently, we classify all -derivations in certain field extensions, algebraic number fields, and their ring of algebraic integers. For the ring of algebraic integers, of the cyclotomic number field ( an primitive root of unity), and a pair of two different -algebra endomorphisms of , we conjecture (using SageMath) a necessary and sufficient condition for a -derivation to be inner. This is done for two different forms of : (i) ( and an odd rational prime), and (ii) ( and any rational prime). As an application of our main result on classification of -derivations and also the conjectures on inner -derivations of , we also conjecture the existence and non-existence of non-zero outer derivations of for the above two forms of , thus answering the twisted derivation problem in . Finally, as another application of our main result on the classification of -derivations , we construct some binary Hom-IDD codes in coding theory.
Cite
@article{arxiv.2412.03507,
title = {Twisted Derivations in Algebraic Number Fields},
author = {Praveen Manju and Rajendra Kumar Sharma},
journal= {arXiv preprint arXiv:2412.03507},
year = {2026}
}