English

Finite covers of groups by cosets or subgroups

Group Theory 2007-05-23 v4 Combinatorics

Abstract

This paper deals with combinatorial aspects of finite covers of groups by cosets or subgroups. Let a1G1,...,akGka_1G_1,...,a_kG_k be left cosets in a group GG such that aiGii=1k{a_iG_i}_{i=1}^k covers each element of GG at least mm times but none of its proper subsystems does. We show that if GG is cyclic, or GG is finite and G1,...,GkG_1,...,G_k are normal Hall subgroups of GG, then km+f([G:i=1kGi])k\geq m+f([G:\bigcap_{i=1}^kG_i]), where f(t=1rptαt)=t=1rαt(pt1)f(\prod_{t=1}^r p_t^{\alpha_t})=\sum_{t=1}^r\alpha_t(p_t-1) if p1,...,prp_1,...,p_r are distinct primes and α1,...,αr\alpha_1,...,\alpha_r are nonnegative integers. When all the aia_i are the identity element of GG and all the GiG_i are subnormal in GG, we prove that there is a composition series from i=1kGi\bigcap_{i=1}^kG_i to GG whose factors are of prime orders. The paper also includes some other results and two challenging conjectures.

Keywords

Cite

@article{arxiv.math/0501451,
  title  = {Finite covers of groups by cosets or subgroups},
  author = {Zhi-Wei Sun},
  journal= {arXiv preprint arXiv:math/0501451},
  year   = {2007}
}

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19 pages