English

Modules over linear spaces admitting a multiplicative basis

Representation Theory 2024-03-15 v1

Abstract

We study the structure of certain modules VV over linear spaces WW with restrictions neither on the dimensions nor on the base field F\mathbb F. A basis B={vi}iI\mathfrak B = \{v_i\}_{i\in I} of VV is called multiplicative respect to the basis B={wj}jJ\mathfrak B' = \{w_j\}_{j \in J} of WW if for any iI,jJi \in I, j \in J we have either viwj=0v_iw_j = 0 or 0viwjFvk0 \neq v_iw_j \in \mathbb Fv_k for some kIk \in I. We show that if VV admits a multiplicative basis then it decomposes as the direct sum V=kVkV=\bigoplus_k V_k of well-described submodules admitting each one a multiplicative basis. Also the minimality of VV is characterized in terms of the multiplicative basis and it is shown that the above direct sum is by means of the family of its minimal submodules, admitting each one a multiplicative basis.

Keywords

Cite

@article{arxiv.2403.08779,
  title  = {Modules over linear spaces admitting a multiplicative basis},
  author = {Antonio J. Calderón and Francisco J. Navarro Izquierdo and José M. Sánchez},
  journal= {arXiv preprint arXiv:2403.08779},
  year   = {2024}
}
R2 v1 2026-06-28T15:19:07.297Z