The Twisted Derivation Problem for Group Rings
Abstract
We study -derivations of a group ring where is a group with center having finite index in and is a semiprime ring with such that either has no torsion elements or that if has -torsion elements, then does not divide the order of and let be -linear endomorphisms of fixing the center of pointwise. We generalize Main Theorem of \cite{Chau-19} and prove that there is a ring such that and that for the natural extensions of to we get , where is the twisted -bimodule. We provide applications of the above result and Main Theorem of \cite{Chau-19} to integral group rings of finite groups and connect twisted derivations of integral group rings to other important problems in the field such as the Isomorphism Problem and the Zassenhaus Conjectures. We also give an example of a group which is both locally finite and nilpotent and such that for every field , there exists an -linear -derivation of which is not -inner.
Cite
@article{arxiv.2007.04642,
title = {The Twisted Derivation Problem for Group Rings},
author = {Dishari Chaudhuri},
journal= {arXiv preprint arXiv:2007.04642},
year = {2020}
}