Quasi-inverse endomorphisms
Abstract
Greither and Pareigis have established a connection between Hopf Galois structures on a Galois extension with Galois group , and the regular subgroups of the group of permutations on , which are normalized by . Byott has rephrased this connection in terms of certain equivalence classes of injective morphisms of into the holomorph of the groups with the same cardinality of . Childs and Corradino have used this theory to construct such Hopf Galois structures, starting from fixed-point-free endomorphisms of that have abelian images. In this paper we show that a fixed-point-free endomorphism has an abelian image if and only if there is another endomorphism that is its inverse with respect to the circle operation in the near-ring of maps on , and give a fairly explicit recipe for constructing all such endomorphisms.
Cite
@article{arxiv.1212.2554,
title = {Quasi-inverse endomorphisms},
author = {A. Caranti},
journal= {arXiv preprint arXiv:1212.2554},
year = {2015}
}
Comments
11 pages. Minor editing for clarity, typos and slips