English

Set-Direct Factorizations of Groups

Group Theory 2018-10-11 v2

Abstract

We consider factorizations G=XYG=XY where GG is a general group, XX and YY are normal subsets of GG and any gGg\in G has a unique representation g=xyg=xy with xXx\in X and yYy\in Y. This definition coincides with the customary and extensively studied definition of a direct product decomposition by subsets of a finite abelian group. Our main result states that a group GG has such a factorization if and only if GG is a central product of X\left\langle X\right\rangle and Y\left\langle Y\right\rangle and the central subgroup XY\left\langle X\right\rangle \cap \left\langle Y\right\rangle satisfies certain abelian factorization conditions. We analyze some special cases and give examples. In particular, simple groups have no non-trivial set-direct factorization.

Keywords

Cite

@article{arxiv.1707.04643,
  title  = {Set-Direct Factorizations of Groups},
  author = {Dan Levy and Attila Maróti},
  journal= {arXiv preprint arXiv:1707.04643},
  year   = {2018}
}

Comments

referee comments included, 19 pages

R2 v1 2026-06-22T20:47:36.746Z