Extending structures I: the level of groups
Abstract
Let be a group and a set such that . We shall describe and classify up to an isomorphism of groups that stabilizes the set of all group structures that can be defined on such that is a subgroup of . A general product, which we call the unified product, is constructed such that both the crossed product and the bicrossed product of two groups are special cases of it. It is associated to and to a system called a group extending structure and we denote it by . There exists a group structure on containing as a subgroup if and only if there exists an isomorphism of groups , for some group extending structure . All such group structures on are classified up to an isomorphism of groups that stabilizes by a cohomological type set . A Schreier type theorem is proved and an explicit example is given: it classifies up to an isomorphism that stabilizes all groups that contain as a subgroup of index 2.
Cite
@article{arxiv.1011.1633,
title = {Extending structures I: the level of groups},
author = {A. L. Agore and G. Militaru},
journal= {arXiv preprint arXiv:1011.1633},
year = {2014}
}
Comments
17 pages; to appear in Algebras and Representation Theory