Twisted Derivations in Algebraic Number Fields

Abstract

Let A be a commutative ring with unity and B = A[θ] be an integral extension of A. Assume that B is an integral domain with quotient field K and E is the minimal splitting field of θ over K. Suppose σ, τ: B → E are two different ring homomorphisms that fix A element-wise. In this article, we classify all A-linear maps D: B → E which are (σ, τ)-derivations. Consequently, we classify all (σ, τ)-derivations in certain field extensions, algebraic number fields, and their ring of algebraic integers. For the ring of algebraic integers, OK = Z[ζ] of the cyclotomic number field K = Q(ζ) (ζ an nth primitive root of unity), and a pair (σ, τ) of two different Z-algebra endomorphisms of OK, we conjecture (using SageMath) a necessary and sufficient condition for a (σ, τ)-derivation D:OK → OK to be inner. This is done for two different forms of n: (i) n = 2rp (r ∈ N and p an odd rational prime), and (ii) n=pk (k ∈ N \1\ and p any rational prime). As an application of our main result on classification of (σ, τ)-derivations D:B → E and also the conjectures on inner (σ, τ)-derivations of OK, we also conjecture the existence and non-existence of non-zero outer derivations of OK for the above two forms of n, thus answering the twisted derivation problem in OK. Finally, as another application of our main result on the classification of (σ, τ)-derivations D:B → E, we construct some binary Hom-IDD codes in coding theory.

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