On the Normalizer-Solubilizer Conjecture_V3
Group Theory
2025-06-11 v3
Abstract
Let be a finite group and be an element of . Define as the set of all such that is soluble. We provide an equivalent condition for the normalizer-solubilizer conjecture, namely , where is the normalizer of . Furthermore, we demonstrate that the conjecture holds in the special case where is a Frobenius group with kernel , the centralizer of , and is of prime order. Finally, we will classify all finite simple groups that contain an element for which is a maximal subgroup of order , where and are prime numbers.
Cite
@article{arxiv.2501.11486,
title = {On the Normalizer-Solubilizer Conjecture_V3},
author = {Hamid Mousavi},
journal= {arXiv preprint arXiv:2501.11486},
year = {2025}
}