A+ CATEGORY SCIENTIFIC UNIT

PDF files of articles are only available for institutions which have paid for the online version upon signing an Institutional User License.

The adjoint cotranspose of modules with respect to subcategories

Volume 163 / 2021

Yuxiao Wang, Guoqiang Zhao, Bo Zhang Colloquium Mathematicum 163 (2021), 23-36 MSC: Primary 18G25; Secondary 16E30. DOI: 10.4064/cm7900-9-2019 Published online: 25 May 2020

Abstract

Let $\mathcal X $ be a subcategory of left $S$-modules and $_{R}U_{S}$ an $(R, S)$-bimodule. As a generalization of an adjoint cotranspose, we introduce an adjoint $\mathcal X $-cotranspose of a left $S$-module relative to $_{R}U_{S}$ and study its homological properties. Let $\mathcal V $ be a subcategory of $\mathcal X $. The relations between adjoint $\mathcal X $-cotransposes and adjoint $\mathcal V $-cotransposes are investigated under the condition that $\mathcal V $ is a generator or cogenerator for $\mathcal X $. Then we give some applications of these results to some categories of interest. In particular, the adjoint counterparts of Gorenstein cotransposes are established.

Authors

  • Yuxiao WangSchool of Science
    Hangzhou Dianzi University
    310018 Hangzhou
    Zhejiang, P.R. China
    e-mail
  • Guoqiang ZhaoSchool of Science
    Hangzhou Dianzi University
    310018 Hangzhou
    Zhejiang, P.R. China
    e-mail
  • Bo ZhangCorresponding author
    School of Mathematics and Information Science
    Henan Polytechnic University
    454000 Jiaozuo
    Henan, P.R. China
    e-mail

Search for IMPAN publications

Query phrase too short. Type at least 4 characters.

Rewrite code from the image

Reload image

Reload image