Original Articles

RELATIVE INJECTIVITY OF MODULES AND EXCELLENT EXTENSIONS

Published in: Quaestiones Mathematicae
Volume 22 , issue 1 , 1999 , pages: 101–107

DOI: 10.1080/16073606.1999.9632062

Author(s): M.M. Parmenter Department of Mathematics and Statistics, Canada , Yiqiang Zhou Department of Mathematics and Statistics, Canada

Keywords: 16S20 , 16D50

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Abstract

Let S be an excellent extension of a ring R ₁, M an S-module and N an R-module. It is proved that M _s is an SI-module iff M _R is an SI-module and that N_R is an SI-module iff (N ⊗_R S) is an SI-module. The notions of GV-modules (V-modules, or S ₃ I-modules), hereditary modules and cohereditary modules are also discussed.

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