English

Abelian groups with a $p^2$-bounded subgroup, revisited

Group Theory 2019-06-27 v2 Representation Theory

Abstract

Let RR be a commutative local uniserial ring of length nn, pp a generator of the maximal ideal, and kk the radical factor field. The pairs (B,A)(B,A) where BB is a finitely generated RR-module and ABA\subset B a submodule of BB such that pmA=0p^mA=0 form the objects in the category Sm(R)S_m(R). We show that in case m=2m=2 the categories Sm(R)S_m(R) are in fact quite similar to each other: If also RR' is a commutative local uniserial ring of length nn and with radical factor field kk, then the categories S2(R)/NRS_2(R)/\mathcal N_R and S2(R)/NRS_2(R')/\mathcal N_{R'} are equivalent for certain nilpotent categorical ideals NRN_R and NRN_{R'}. As an application, we recover the known classification of all pairs (B,A)(B,A) where BB is a finitely generated abelian group and ABA\subset B a subgroup of BB which is p2p^2-bounded for a given prime number pp.

Keywords

Cite

@article{arxiv.math/0605664,
  title  = {Abelian groups with a $p^2$-bounded subgroup, revisited},
  author = {Carla Petroro and Markus Schmidmeier},
  journal= {arXiv preprint arXiv:math/0605664},
  year   = {2019}
}

Comments

14 pages, to appear in Journal of Algebra and its Applications